How do we know the LHC results are robust?












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Nature article on reproducibility in science.



According to that article, a (surprisingly) large number of experiments aren't reproducible, or at least there have been failed attempted reproductions. In one of the figures, it's said that 70% of scientists in physics & engineering have failed to reproduce someone else's results, and 50% have failed to reproduce their own.



Clearly, if something cannot be reproduced, its veracity is called into question. Also clearly, because there's only one particle accelerator with the power of the LHC in the world, we aren't able to independently reproduce LHC results. In fact, because 50% of physics & engineering experiments aren't reproducible by the original scientists, one might expect there's a 50% chance that if the people who originally built the LHC built another LHC, they will not reach the same results. How, then, do we know that the LHC results (such as the discovery of the Higgs boson) are robust? Or do we not know the LHC results are robust, and are effectively proceeding on faith that they are?



EDIT: As pointed out by Chris Hayes in the comments, I misinterpreted the Nature article. It says that 50% of physical scientists have failed to reproduce their own results, which is not the same statement as 50% of physics experiments aren't reproducible. This significantly eases the concern I had when I wrote the question. I'm leaving the question here however, because the core idea - how can we know the LHC's results are robust when we only have one LHC? - remains the same, and because innisfree wrote an excellent answer.










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  • 10




    $begingroup$
    I think it is worth pointing out that the LHC doesn't just do one particle collision and then say the experiment is completed. How much do you know about what goes into such experiments, how many times they are actually repeated, and then how the data is analyzed from there?
    $endgroup$
    – Aaron Stevens
    Mar 27 at 5:11






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    I was asking if you had looked into the efforts taken to make sure the results from the LHC are good results and not just mistakes. Also the LHC isn't the only particle collider in existence.
    $endgroup$
    – Aaron Stevens
    Mar 27 at 5:19








  • 7




    $begingroup$
    For more about this important question than you may have bargained for, look for discussions about the "look-elsewhere effect" in the statistical analysis of the data from the mostly-independent ATLAS and CMS experiments at the LHC, especially in the context of their joint discovery of the Higgs particle.
    $endgroup$
    – rob
    Mar 27 at 5:52






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    @Allure "Half [of scientists] have failed to reproduce their own experiments" is an enormously different statement from "half of all experiments are non-reproducible". The former statement (from the Nature article) includes scientists who have failed to reproduce a single one of their experiments, even if they successfully reproduced 99 out of 100. See page 10 of the questionnaire for the exact wording.
    $endgroup$
    – Chris Hayes
    Mar 27 at 9:46






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    @ChrisHayes My thought exactly! Furthermore, a failed attempt to replicate an experiment doesn't necessarily mean that the original experiment is "non-reproducible".
    $endgroup$
    – jkej
    Mar 27 at 10:13
















59












$begingroup$


Nature article on reproducibility in science.



According to that article, a (surprisingly) large number of experiments aren't reproducible, or at least there have been failed attempted reproductions. In one of the figures, it's said that 70% of scientists in physics & engineering have failed to reproduce someone else's results, and 50% have failed to reproduce their own.



Clearly, if something cannot be reproduced, its veracity is called into question. Also clearly, because there's only one particle accelerator with the power of the LHC in the world, we aren't able to independently reproduce LHC results. In fact, because 50% of physics & engineering experiments aren't reproducible by the original scientists, one might expect there's a 50% chance that if the people who originally built the LHC built another LHC, they will not reach the same results. How, then, do we know that the LHC results (such as the discovery of the Higgs boson) are robust? Or do we not know the LHC results are robust, and are effectively proceeding on faith that they are?



EDIT: As pointed out by Chris Hayes in the comments, I misinterpreted the Nature article. It says that 50% of physical scientists have failed to reproduce their own results, which is not the same statement as 50% of physics experiments aren't reproducible. This significantly eases the concern I had when I wrote the question. I'm leaving the question here however, because the core idea - how can we know the LHC's results are robust when we only have one LHC? - remains the same, and because innisfree wrote an excellent answer.










share|cite|improve this question











$endgroup$








  • 10




    $begingroup$
    I think it is worth pointing out that the LHC doesn't just do one particle collision and then say the experiment is completed. How much do you know about what goes into such experiments, how many times they are actually repeated, and then how the data is analyzed from there?
    $endgroup$
    – Aaron Stevens
    Mar 27 at 5:11






  • 5




    $begingroup$
    I was asking if you had looked into the efforts taken to make sure the results from the LHC are good results and not just mistakes. Also the LHC isn't the only particle collider in existence.
    $endgroup$
    – Aaron Stevens
    Mar 27 at 5:19








  • 7




    $begingroup$
    For more about this important question than you may have bargained for, look for discussions about the "look-elsewhere effect" in the statistical analysis of the data from the mostly-independent ATLAS and CMS experiments at the LHC, especially in the context of their joint discovery of the Higgs particle.
    $endgroup$
    – rob
    Mar 27 at 5:52






  • 21




    $begingroup$
    @Allure "Half [of scientists] have failed to reproduce their own experiments" is an enormously different statement from "half of all experiments are non-reproducible". The former statement (from the Nature article) includes scientists who have failed to reproduce a single one of their experiments, even if they successfully reproduced 99 out of 100. See page 10 of the questionnaire for the exact wording.
    $endgroup$
    – Chris Hayes
    Mar 27 at 9:46






  • 3




    $begingroup$
    @ChrisHayes My thought exactly! Furthermore, a failed attempt to replicate an experiment doesn't necessarily mean that the original experiment is "non-reproducible".
    $endgroup$
    – jkej
    Mar 27 at 10:13














59












59








59


9



$begingroup$


Nature article on reproducibility in science.



According to that article, a (surprisingly) large number of experiments aren't reproducible, or at least there have been failed attempted reproductions. In one of the figures, it's said that 70% of scientists in physics & engineering have failed to reproduce someone else's results, and 50% have failed to reproduce their own.



Clearly, if something cannot be reproduced, its veracity is called into question. Also clearly, because there's only one particle accelerator with the power of the LHC in the world, we aren't able to independently reproduce LHC results. In fact, because 50% of physics & engineering experiments aren't reproducible by the original scientists, one might expect there's a 50% chance that if the people who originally built the LHC built another LHC, they will not reach the same results. How, then, do we know that the LHC results (such as the discovery of the Higgs boson) are robust? Or do we not know the LHC results are robust, and are effectively proceeding on faith that they are?



EDIT: As pointed out by Chris Hayes in the comments, I misinterpreted the Nature article. It says that 50% of physical scientists have failed to reproduce their own results, which is not the same statement as 50% of physics experiments aren't reproducible. This significantly eases the concern I had when I wrote the question. I'm leaving the question here however, because the core idea - how can we know the LHC's results are robust when we only have one LHC? - remains the same, and because innisfree wrote an excellent answer.










share|cite|improve this question











$endgroup$




Nature article on reproducibility in science.



According to that article, a (surprisingly) large number of experiments aren't reproducible, or at least there have been failed attempted reproductions. In one of the figures, it's said that 70% of scientists in physics & engineering have failed to reproduce someone else's results, and 50% have failed to reproduce their own.



Clearly, if something cannot be reproduced, its veracity is called into question. Also clearly, because there's only one particle accelerator with the power of the LHC in the world, we aren't able to independently reproduce LHC results. In fact, because 50% of physics & engineering experiments aren't reproducible by the original scientists, one might expect there's a 50% chance that if the people who originally built the LHC built another LHC, they will not reach the same results. How, then, do we know that the LHC results (such as the discovery of the Higgs boson) are robust? Or do we not know the LHC results are robust, and are effectively proceeding on faith that they are?



EDIT: As pointed out by Chris Hayes in the comments, I misinterpreted the Nature article. It says that 50% of physical scientists have failed to reproduce their own results, which is not the same statement as 50% of physics experiments aren't reproducible. This significantly eases the concern I had when I wrote the question. I'm leaving the question here however, because the core idea - how can we know the LHC's results are robust when we only have one LHC? - remains the same, and because innisfree wrote an excellent answer.







particle-physics large-hadron-collider data-analysis






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share|cite|improve this question








edited Mar 27 at 10:41







Allure

















asked Mar 27 at 4:44









AllureAllure

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2,277925








  • 10




    $begingroup$
    I think it is worth pointing out that the LHC doesn't just do one particle collision and then say the experiment is completed. How much do you know about what goes into such experiments, how many times they are actually repeated, and then how the data is analyzed from there?
    $endgroup$
    – Aaron Stevens
    Mar 27 at 5:11






  • 5




    $begingroup$
    I was asking if you had looked into the efforts taken to make sure the results from the LHC are good results and not just mistakes. Also the LHC isn't the only particle collider in existence.
    $endgroup$
    – Aaron Stevens
    Mar 27 at 5:19








  • 7




    $begingroup$
    For more about this important question than you may have bargained for, look for discussions about the "look-elsewhere effect" in the statistical analysis of the data from the mostly-independent ATLAS and CMS experiments at the LHC, especially in the context of their joint discovery of the Higgs particle.
    $endgroup$
    – rob
    Mar 27 at 5:52






  • 21




    $begingroup$
    @Allure "Half [of scientists] have failed to reproduce their own experiments" is an enormously different statement from "half of all experiments are non-reproducible". The former statement (from the Nature article) includes scientists who have failed to reproduce a single one of their experiments, even if they successfully reproduced 99 out of 100. See page 10 of the questionnaire for the exact wording.
    $endgroup$
    – Chris Hayes
    Mar 27 at 9:46






  • 3




    $begingroup$
    @ChrisHayes My thought exactly! Furthermore, a failed attempt to replicate an experiment doesn't necessarily mean that the original experiment is "non-reproducible".
    $endgroup$
    – jkej
    Mar 27 at 10:13














  • 10




    $begingroup$
    I think it is worth pointing out that the LHC doesn't just do one particle collision and then say the experiment is completed. How much do you know about what goes into such experiments, how many times they are actually repeated, and then how the data is analyzed from there?
    $endgroup$
    – Aaron Stevens
    Mar 27 at 5:11






  • 5




    $begingroup$
    I was asking if you had looked into the efforts taken to make sure the results from the LHC are good results and not just mistakes. Also the LHC isn't the only particle collider in existence.
    $endgroup$
    – Aaron Stevens
    Mar 27 at 5:19








  • 7




    $begingroup$
    For more about this important question than you may have bargained for, look for discussions about the "look-elsewhere effect" in the statistical analysis of the data from the mostly-independent ATLAS and CMS experiments at the LHC, especially in the context of their joint discovery of the Higgs particle.
    $endgroup$
    – rob
    Mar 27 at 5:52






  • 21




    $begingroup$
    @Allure "Half [of scientists] have failed to reproduce their own experiments" is an enormously different statement from "half of all experiments are non-reproducible". The former statement (from the Nature article) includes scientists who have failed to reproduce a single one of their experiments, even if they successfully reproduced 99 out of 100. See page 10 of the questionnaire for the exact wording.
    $endgroup$
    – Chris Hayes
    Mar 27 at 9:46






  • 3




    $begingroup$
    @ChrisHayes My thought exactly! Furthermore, a failed attempt to replicate an experiment doesn't necessarily mean that the original experiment is "non-reproducible".
    $endgroup$
    – jkej
    Mar 27 at 10:13








10




10




$begingroup$
I think it is worth pointing out that the LHC doesn't just do one particle collision and then say the experiment is completed. How much do you know about what goes into such experiments, how many times they are actually repeated, and then how the data is analyzed from there?
$endgroup$
– Aaron Stevens
Mar 27 at 5:11




$begingroup$
I think it is worth pointing out that the LHC doesn't just do one particle collision and then say the experiment is completed. How much do you know about what goes into such experiments, how many times they are actually repeated, and then how the data is analyzed from there?
$endgroup$
– Aaron Stevens
Mar 27 at 5:11




5




5




$begingroup$
I was asking if you had looked into the efforts taken to make sure the results from the LHC are good results and not just mistakes. Also the LHC isn't the only particle collider in existence.
$endgroup$
– Aaron Stevens
Mar 27 at 5:19






$begingroup$
I was asking if you had looked into the efforts taken to make sure the results from the LHC are good results and not just mistakes. Also the LHC isn't the only particle collider in existence.
$endgroup$
– Aaron Stevens
Mar 27 at 5:19






7




7




$begingroup$
For more about this important question than you may have bargained for, look for discussions about the "look-elsewhere effect" in the statistical analysis of the data from the mostly-independent ATLAS and CMS experiments at the LHC, especially in the context of their joint discovery of the Higgs particle.
$endgroup$
– rob
Mar 27 at 5:52




$begingroup$
For more about this important question than you may have bargained for, look for discussions about the "look-elsewhere effect" in the statistical analysis of the data from the mostly-independent ATLAS and CMS experiments at the LHC, especially in the context of their joint discovery of the Higgs particle.
$endgroup$
– rob
Mar 27 at 5:52




21




21




$begingroup$
@Allure "Half [of scientists] have failed to reproduce their own experiments" is an enormously different statement from "half of all experiments are non-reproducible". The former statement (from the Nature article) includes scientists who have failed to reproduce a single one of their experiments, even if they successfully reproduced 99 out of 100. See page 10 of the questionnaire for the exact wording.
$endgroup$
– Chris Hayes
Mar 27 at 9:46




$begingroup$
@Allure "Half [of scientists] have failed to reproduce their own experiments" is an enormously different statement from "half of all experiments are non-reproducible". The former statement (from the Nature article) includes scientists who have failed to reproduce a single one of their experiments, even if they successfully reproduced 99 out of 100. See page 10 of the questionnaire for the exact wording.
$endgroup$
– Chris Hayes
Mar 27 at 9:46




3




3




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@ChrisHayes My thought exactly! Furthermore, a failed attempt to replicate an experiment doesn't necessarily mean that the original experiment is "non-reproducible".
$endgroup$
– jkej
Mar 27 at 10:13




$begingroup$
@ChrisHayes My thought exactly! Furthermore, a failed attempt to replicate an experiment doesn't necessarily mean that the original experiment is "non-reproducible".
$endgroup$
– jkej
Mar 27 at 10:13










4 Answers
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That's a really great question. The 'replication crisis' is that many effects in social sciences (and, although to a lesser extent, other scientific fields) couldn't be reproduced. There are many factors leading to this phenomenon, including




  • Weak standards of evidence, e.g., $2sigma$ evidence required to demonstrate an effect

  • Researchers (subconsciously or otherwise) conducting bad scientific practice by selectively reporting and publishing significant results. E.g. considering many different effects until they find a significant effect or collecting data until they find a significant effect.

  • Poor training in statistical methods.


I'm not entirely sure about the exact efforts that the LHC experiments are making to ensure that they don't suffer the same problems. But let me say some things that should at least put your mind at ease:




  • Particle physics typically requires a high-standard of evidence for discoveries ($5sigma$). To put that into perspective, the corresponding type-1 error rates are $0.05$ for $2sigma$ and about $3times10^{-7}$ for $5sigma$

  • The results from the LHC are already replicated!


    • There are several detectors placed around the LHC ring. Two of them, called ATLAS and CMS, are general purpose detectors for Standard Model and Beyond the Standard Model physics. Both of them found compelling evidence for the Higgs boson. They are in principle completely independent (though in practice staff switch experiments, experimentalists from each experiment presumably talk and socialize with each other etc, so possibly a very small dependence in analysis choices etc).

    • The Tevatron, a similar collider experiment in the USA operating at lower-energies, found direct evidence for the Higgs boson.

    • The Higgs boson was observed in several datasets collected at the LHC



  • The LHC (typically) publishes findings regardless of their statistical significance, i.e., significant results are not selectively reported.

  • The LHC teams are guided by statistical committees, hopefully ensuring good practice

  • The LHC is in principle committed to open data, which means a lot of the data should at some point become public. This is one recommendation for helping the crisis in social sciences.

  • Typical training for experimentalists at the LHC includes basic statistics (although in my experience LHC experimentalits are still subject to the same traps and misinterpretations as everyone else).

  • All members (thousands) of the experimental teams are authors on the papers. The incentive for bad practices such as $p$-hacking is presumably slightly lowered, as you cannot 'discover' a new effect and publish it only under your own name, and have improved job/grant prospects. This incentive might be a factor in the replication crisis in social sciences.

  • All papers are subject to internal review (which I understand to be quite rigorous) as well as external review by a journal

  • LHC analyses are often (I'm not sure who plans or decides this) blinded. This means that the experimentalists cannot tweak the analyses depending on the result. They are 'blind' to the result, make their choices, then unblind it only at the end. This should help prevent $p$-hacking

  • LHC analysis typically (though not always) report a global $p$-value, which has beeen corrected for multiple comparisons (the look-elsewhere effect).

  • The Higgs boson (or similar new physics) was theoretically required due to a 'no-lose' theorem about the breakdown of models without a Higgs at LHC energies, so we can be even more confident that it is a genuine effect.
    The other new effects that are being searched for at the LHC, however, arguably aren't as well motivated, so this doesn't apply to them. E.g., there was no a priori motivation for a 750 GeV resonanace that was hinted at in data but ultimately disappeared.


If anything, there is a suspicion that the practices at the LHC might even result in the opposite of the 'replication crisis;' analyses that find effects that are somewhat significant might be examined and tweaked until they decrease. In this paper it was argued this was the case for SUSY searches in run-1.






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  • 21




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    This is an excellent answer! I think it should be further emphasized how different $2sigma$ is from $5 sigma$. Using the standard $2 sigma$ conventions of social science, you have a 5% chance of getting a significant result every time you test a completely false hypothesis. (And this can easily be boosted by a factor of 10 by $p$-hacking techniques, plus you can report something like $p = 0.1$ as "trending towards significance".) Asking for $5 sigma$ is not merely being $5/2$ as rigorous, the corresponding $p$-value cutoff is roughly $0.0000003$.
    $endgroup$
    – knzhou
    Mar 27 at 10:32








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    I think saying the "social sciences" is possibly a bit overly specific. There's been much talk and news of reproducibility problems in biology and chemistry as well, at least in semi-recent years, though perhaps not as bad as the social sciences are experiencing.
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    – mbrig
    Mar 27 at 17:05






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    Although it is a slightly different issue than the statistical considerations that are the focus of this answer, laymen also often don't appreciate that the LHC has necessarily reproduced many previous discoveries: atlas.cern/updates/atlas-blog/art-rediscovery . From these and similar studies, we can directly evaluate whether the reproducibility crisis seems to be present in particle physics... and, not surprisingly given the extensive measures described in your answer, it appears that it does better than many (all?) other fields, so far.
    $endgroup$
    – Rococo
    Mar 27 at 17:22








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    A minor addition is that the prior probability for the Higgs boson existing and to a much lesser extent being in the range it was found is likely higher than "surprising" results in social science. Which is just to say it wasn't a surprise that the Higgs boson existed; that's what the theory predicted. Some new non-Higgs particle would warrant much more skepticism.
    $endgroup$
    – Derek Elkins
    Mar 28 at 6:49










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    all great points! thanks
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    – innisfree
    Mar 28 at 8:50



















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In addition to innisfree's excellent list, there's another fundamental difference between modern physics experiments and human-based experiments: While the latter tend to be exploratory, physics experiments these days are primarily confirmatory.



In particular, we have theories (sometimes competing theories) that model our idea of how physics works. These theories make specific predictions about the kinds of results we ought to see, and physics experiments are generally then built to discriminate between the various predictions, which are typically either of the form "this effect happens or doesn't" (jet quenching, dispersion in the speed of light due to quantized space), or "this variable has some value" (the mass of the Higgs boson). We use computer simulations to produce pictures of what the results would look like in the different cases and then match the experimental data with those models; nearly always, what we get matches one or the other of the suspected cases. In this way, experimental results in physics are rarely shocking.



Occasionally, however, what we see is something really unexpected, such as the time OPERA seemed to have observed faster-than-light motion—or, for that matter, Rutherford's gold-foil experiment. In these cases, priority tends to go toward reproducing the effect if possible and explaining what's going on (which usually tends to be an error of some sort, such as the miswired cable in OPERA, but does sometimes reveal something totally new, which then tends to become the subject of intense research itself until the new effect is understood well enough to start making models of it again).






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    I understand what you mean, but "match experimental data with models" sounds like there is ample reason to expect confirmation bias if not done properly.
    $endgroup$
    – Scrontch
    Mar 27 at 8:45










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    @Scrontch If not done properly, of course, but the useful property of these two questions (yes/no and value-in-range) is that we can run simulations ahead of time and define with clarity what the results should look like in the different possible universes, including such information as how wide the margins need to be to give us confidence. There are (fairly) standard ways of doing this.
    $endgroup$
    – chrylis
    Mar 27 at 20:31



















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The paper seems to be a statistical analysis of opinions, and in no way is rigorous enough to raise a question about the LHC. It is statistics about undisclosed statistics.



Here is a simpler example for statistics of failures: Take an Olympics athlete. How many failures before breaking the record? Is the record not broken because there may have been a thousand failures before breaking it?



What about the hundreds of athletes who try to reproduce and get a better record? Should they not try?



The statistics of failed experiments is similar: There is a goal (actually thousands of goals depending on the physics discipline), and a number of trials to reach the goal, though the olympics record analogy should not be taken too far, only to point out the difficulty of combining statistics from a large number of sets. In physics there may be wrong assumptions, blind alleys, logical errors... that may contribute to the failure of reproducibility. The confidence level from statistical and systematic errors are used to define the robustness of a measurement.



from the question:



"because 50% of physics & engineering experiments aren't reproducible by the original scientists",



This is a fake statement from a dubious poll. The statistical significance of the "not reproducible " has not been checked in the poll. Only if it were a one standard deviation result , there exists almost a 50% a probability of the next trial not to reproduce.




one might expect there's a 50% chance that if the people who originally built the LHC built another LHC, they will not reach the same results




No way, because engineering and physics analysis at the LHC are over the 4 sigma level, and the probability of negation is small. Even a 3sigma level has confidence 99% , so the chance is in no way 50%.



We know the LHC results are robust because there are two major and many smaller experiments trying for the same goals. The reason there are two experiments is so that systematic errors in one will not give spurious results. We trust that the measurement statistics that give the end results are correct, as we trust for the record breaking run that the measured times and distances are correct.



(And LHC is not an experiment. It is where experiments can be carried out depending on the efforts and ingenuity of researchers, it is the field where the Olympics takes place.)



The robustness of scientific results depends on the specific experimental measurements, not on integrating over all disparate experiments ever made. Bad use of statistics. For statistics of statistics, i.e. the confidence level of the "failed experiments" have to be done rigorously and the paper is not doing that.



Another way to look at it: If there were no failures , would the experiments mean anything? They would be predictable by pen and paper.






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  • 11




    $begingroup$
    I'm not sure I buy the Olympics analogy. Failed attempts at breaking a record isn't the same thing as a failed attempt to reproduce an experiment. It also sounds like you are saying we should just cherry pick what does work and ignore when it fails.
    $endgroup$
    – Aaron Stevens
    Mar 27 at 5:14












  • $begingroup$
    @AaronStevens " cherry pick what does work" but is not that evolution in general? and "ignore when it fails" one learns from failure to design better experiments.
    $endgroup$
    – anna v
    Mar 27 at 5:35










  • $begingroup$
    Comments are not for extended discussion; this conversation has been moved to chat.
    $endgroup$
    – ACuriousMind
    Mar 29 at 22:24



















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Any one experiment is repeated many times on the same equipment. They look for rare events, and it takes a lot of rare events to be sure that they aren't just coincidence.



The question about how many LHCs it takes to be sure, is different.



Each LHC component had to be carefully tested to make sure it was in spec. Remember the example of the experiment that seemed to get a result slightly faster than light. Because it was so important, they went to great expense to test everything, components around the world, until they found two components that were out of spec, that created the small error. If the error had been in the other direction would they have done that testing? No. They wouldn't even notice the error. It wouldn't be important. What made this one important was faster than light. Did they carefully record every out-of-spec component they found that would tend to slow the signal, that might cancel the positive errors they found? Maybe. That wasn't what they were looking for, though. That was a complication and not a solution to the problem.



After the tested LHC components are installed they must be tested again in case they were changed while being handled.



Then they must be calibrated. Every analog output could have a baseline that's a little bit off, because of random things. A solder joint that's slightly different. An AC circuit nearby that changes things a little bit every 120th of a second. The baseline must be calibrated for every one of them. Once the signal has been converted to digital then it's OK. Errors smaller than the cutoff are ignored, and larger errors make one bit difference. For the calibration, you know what the outcome is supposed to be, so you set it to that.



Could all this have somehow changed the outcomes so that some extremely unlikely results are falsely reported more often than they should be?



There's no theoretical reason to expect it. And the engineers who assembled the LHC were very very careful. But how could we test it? The obvious way is to build at least 2 more LHCs and notice how consistent their results are. That would be very expensive. It will not be done.



We can get some confidence by looking at results from other machinery. It's like -- the LHC was used to scan for a wide range of possible results that could be called the Higgs boson. They could do in years what a lesser machine might take centuries to do. But once we have a specific Higgs boson to look for, some of the others can look for that specifically and see whether they find it. If they do, then there's probably something there beyond equipment error.



Something else they can do (which I think they are doing part of the time) is look for things that are supposed to not happen that nobody predicts will happen. When they find one for sure then everybody will get excited. People will say there's something wrong, and insist that they check for every possible error that could give them that result. Like with the faster-than-light thing.






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    4 Answers
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    active

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    4 Answers
    4






    active

    oldest

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    active

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    active

    oldest

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    86












    $begingroup$

    That's a really great question. The 'replication crisis' is that many effects in social sciences (and, although to a lesser extent, other scientific fields) couldn't be reproduced. There are many factors leading to this phenomenon, including




    • Weak standards of evidence, e.g., $2sigma$ evidence required to demonstrate an effect

    • Researchers (subconsciously or otherwise) conducting bad scientific practice by selectively reporting and publishing significant results. E.g. considering many different effects until they find a significant effect or collecting data until they find a significant effect.

    • Poor training in statistical methods.


    I'm not entirely sure about the exact efforts that the LHC experiments are making to ensure that they don't suffer the same problems. But let me say some things that should at least put your mind at ease:




    • Particle physics typically requires a high-standard of evidence for discoveries ($5sigma$). To put that into perspective, the corresponding type-1 error rates are $0.05$ for $2sigma$ and about $3times10^{-7}$ for $5sigma$

    • The results from the LHC are already replicated!


      • There are several detectors placed around the LHC ring. Two of them, called ATLAS and CMS, are general purpose detectors for Standard Model and Beyond the Standard Model physics. Both of them found compelling evidence for the Higgs boson. They are in principle completely independent (though in practice staff switch experiments, experimentalists from each experiment presumably talk and socialize with each other etc, so possibly a very small dependence in analysis choices etc).

      • The Tevatron, a similar collider experiment in the USA operating at lower-energies, found direct evidence for the Higgs boson.

      • The Higgs boson was observed in several datasets collected at the LHC



    • The LHC (typically) publishes findings regardless of their statistical significance, i.e., significant results are not selectively reported.

    • The LHC teams are guided by statistical committees, hopefully ensuring good practice

    • The LHC is in principle committed to open data, which means a lot of the data should at some point become public. This is one recommendation for helping the crisis in social sciences.

    • Typical training for experimentalists at the LHC includes basic statistics (although in my experience LHC experimentalits are still subject to the same traps and misinterpretations as everyone else).

    • All members (thousands) of the experimental teams are authors on the papers. The incentive for bad practices such as $p$-hacking is presumably slightly lowered, as you cannot 'discover' a new effect and publish it only under your own name, and have improved job/grant prospects. This incentive might be a factor in the replication crisis in social sciences.

    • All papers are subject to internal review (which I understand to be quite rigorous) as well as external review by a journal

    • LHC analyses are often (I'm not sure who plans or decides this) blinded. This means that the experimentalists cannot tweak the analyses depending on the result. They are 'blind' to the result, make their choices, then unblind it only at the end. This should help prevent $p$-hacking

    • LHC analysis typically (though not always) report a global $p$-value, which has beeen corrected for multiple comparisons (the look-elsewhere effect).

    • The Higgs boson (or similar new physics) was theoretically required due to a 'no-lose' theorem about the breakdown of models without a Higgs at LHC energies, so we can be even more confident that it is a genuine effect.
      The other new effects that are being searched for at the LHC, however, arguably aren't as well motivated, so this doesn't apply to them. E.g., there was no a priori motivation for a 750 GeV resonanace that was hinted at in data but ultimately disappeared.


    If anything, there is a suspicion that the practices at the LHC might even result in the opposite of the 'replication crisis;' analyses that find effects that are somewhat significant might be examined and tweaked until they decrease. In this paper it was argued this was the case for SUSY searches in run-1.






    share|cite|improve this answer











    $endgroup$









    • 21




      $begingroup$
      This is an excellent answer! I think it should be further emphasized how different $2sigma$ is from $5 sigma$. Using the standard $2 sigma$ conventions of social science, you have a 5% chance of getting a significant result every time you test a completely false hypothesis. (And this can easily be boosted by a factor of 10 by $p$-hacking techniques, plus you can report something like $p = 0.1$ as "trending towards significance".) Asking for $5 sigma$ is not merely being $5/2$ as rigorous, the corresponding $p$-value cutoff is roughly $0.0000003$.
      $endgroup$
      – knzhou
      Mar 27 at 10:32








    • 3




      $begingroup$
      I think saying the "social sciences" is possibly a bit overly specific. There's been much talk and news of reproducibility problems in biology and chemistry as well, at least in semi-recent years, though perhaps not as bad as the social sciences are experiencing.
      $endgroup$
      – mbrig
      Mar 27 at 17:05






    • 5




      $begingroup$
      Although it is a slightly different issue than the statistical considerations that are the focus of this answer, laymen also often don't appreciate that the LHC has necessarily reproduced many previous discoveries: atlas.cern/updates/atlas-blog/art-rediscovery . From these and similar studies, we can directly evaluate whether the reproducibility crisis seems to be present in particle physics... and, not surprisingly given the extensive measures described in your answer, it appears that it does better than many (all?) other fields, so far.
      $endgroup$
      – Rococo
      Mar 27 at 17:22








    • 1




      $begingroup$
      A minor addition is that the prior probability for the Higgs boson existing and to a much lesser extent being in the range it was found is likely higher than "surprising" results in social science. Which is just to say it wasn't a surprise that the Higgs boson existed; that's what the theory predicted. Some new non-Higgs particle would warrant much more skepticism.
      $endgroup$
      – Derek Elkins
      Mar 28 at 6:49










    • $begingroup$
      all great points! thanks
      $endgroup$
      – innisfree
      Mar 28 at 8:50
















    86












    $begingroup$

    That's a really great question. The 'replication crisis' is that many effects in social sciences (and, although to a lesser extent, other scientific fields) couldn't be reproduced. There are many factors leading to this phenomenon, including




    • Weak standards of evidence, e.g., $2sigma$ evidence required to demonstrate an effect

    • Researchers (subconsciously or otherwise) conducting bad scientific practice by selectively reporting and publishing significant results. E.g. considering many different effects until they find a significant effect or collecting data until they find a significant effect.

    • Poor training in statistical methods.


    I'm not entirely sure about the exact efforts that the LHC experiments are making to ensure that they don't suffer the same problems. But let me say some things that should at least put your mind at ease:




    • Particle physics typically requires a high-standard of evidence for discoveries ($5sigma$). To put that into perspective, the corresponding type-1 error rates are $0.05$ for $2sigma$ and about $3times10^{-7}$ for $5sigma$

    • The results from the LHC are already replicated!


      • There are several detectors placed around the LHC ring. Two of them, called ATLAS and CMS, are general purpose detectors for Standard Model and Beyond the Standard Model physics. Both of them found compelling evidence for the Higgs boson. They are in principle completely independent (though in practice staff switch experiments, experimentalists from each experiment presumably talk and socialize with each other etc, so possibly a very small dependence in analysis choices etc).

      • The Tevatron, a similar collider experiment in the USA operating at lower-energies, found direct evidence for the Higgs boson.

      • The Higgs boson was observed in several datasets collected at the LHC



    • The LHC (typically) publishes findings regardless of their statistical significance, i.e., significant results are not selectively reported.

    • The LHC teams are guided by statistical committees, hopefully ensuring good practice

    • The LHC is in principle committed to open data, which means a lot of the data should at some point become public. This is one recommendation for helping the crisis in social sciences.

    • Typical training for experimentalists at the LHC includes basic statistics (although in my experience LHC experimentalits are still subject to the same traps and misinterpretations as everyone else).

    • All members (thousands) of the experimental teams are authors on the papers. The incentive for bad practices such as $p$-hacking is presumably slightly lowered, as you cannot 'discover' a new effect and publish it only under your own name, and have improved job/grant prospects. This incentive might be a factor in the replication crisis in social sciences.

    • All papers are subject to internal review (which I understand to be quite rigorous) as well as external review by a journal

    • LHC analyses are often (I'm not sure who plans or decides this) blinded. This means that the experimentalists cannot tweak the analyses depending on the result. They are 'blind' to the result, make their choices, then unblind it only at the end. This should help prevent $p$-hacking

    • LHC analysis typically (though not always) report a global $p$-value, which has beeen corrected for multiple comparisons (the look-elsewhere effect).

    • The Higgs boson (or similar new physics) was theoretically required due to a 'no-lose' theorem about the breakdown of models without a Higgs at LHC energies, so we can be even more confident that it is a genuine effect.
      The other new effects that are being searched for at the LHC, however, arguably aren't as well motivated, so this doesn't apply to them. E.g., there was no a priori motivation for a 750 GeV resonanace that was hinted at in data but ultimately disappeared.


    If anything, there is a suspicion that the practices at the LHC might even result in the opposite of the 'replication crisis;' analyses that find effects that are somewhat significant might be examined and tweaked until they decrease. In this paper it was argued this was the case for SUSY searches in run-1.






    share|cite|improve this answer











    $endgroup$









    • 21




      $begingroup$
      This is an excellent answer! I think it should be further emphasized how different $2sigma$ is from $5 sigma$. Using the standard $2 sigma$ conventions of social science, you have a 5% chance of getting a significant result every time you test a completely false hypothesis. (And this can easily be boosted by a factor of 10 by $p$-hacking techniques, plus you can report something like $p = 0.1$ as "trending towards significance".) Asking for $5 sigma$ is not merely being $5/2$ as rigorous, the corresponding $p$-value cutoff is roughly $0.0000003$.
      $endgroup$
      – knzhou
      Mar 27 at 10:32








    • 3




      $begingroup$
      I think saying the "social sciences" is possibly a bit overly specific. There's been much talk and news of reproducibility problems in biology and chemistry as well, at least in semi-recent years, though perhaps not as bad as the social sciences are experiencing.
      $endgroup$
      – mbrig
      Mar 27 at 17:05






    • 5




      $begingroup$
      Although it is a slightly different issue than the statistical considerations that are the focus of this answer, laymen also often don't appreciate that the LHC has necessarily reproduced many previous discoveries: atlas.cern/updates/atlas-blog/art-rediscovery . From these and similar studies, we can directly evaluate whether the reproducibility crisis seems to be present in particle physics... and, not surprisingly given the extensive measures described in your answer, it appears that it does better than many (all?) other fields, so far.
      $endgroup$
      – Rococo
      Mar 27 at 17:22








    • 1




      $begingroup$
      A minor addition is that the prior probability for the Higgs boson existing and to a much lesser extent being in the range it was found is likely higher than "surprising" results in social science. Which is just to say it wasn't a surprise that the Higgs boson existed; that's what the theory predicted. Some new non-Higgs particle would warrant much more skepticism.
      $endgroup$
      – Derek Elkins
      Mar 28 at 6:49










    • $begingroup$
      all great points! thanks
      $endgroup$
      – innisfree
      Mar 28 at 8:50














    86












    86








    86





    $begingroup$

    That's a really great question. The 'replication crisis' is that many effects in social sciences (and, although to a lesser extent, other scientific fields) couldn't be reproduced. There are many factors leading to this phenomenon, including




    • Weak standards of evidence, e.g., $2sigma$ evidence required to demonstrate an effect

    • Researchers (subconsciously or otherwise) conducting bad scientific practice by selectively reporting and publishing significant results. E.g. considering many different effects until they find a significant effect or collecting data until they find a significant effect.

    • Poor training in statistical methods.


    I'm not entirely sure about the exact efforts that the LHC experiments are making to ensure that they don't suffer the same problems. But let me say some things that should at least put your mind at ease:




    • Particle physics typically requires a high-standard of evidence for discoveries ($5sigma$). To put that into perspective, the corresponding type-1 error rates are $0.05$ for $2sigma$ and about $3times10^{-7}$ for $5sigma$

    • The results from the LHC are already replicated!


      • There are several detectors placed around the LHC ring. Two of them, called ATLAS and CMS, are general purpose detectors for Standard Model and Beyond the Standard Model physics. Both of them found compelling evidence for the Higgs boson. They are in principle completely independent (though in practice staff switch experiments, experimentalists from each experiment presumably talk and socialize with each other etc, so possibly a very small dependence in analysis choices etc).

      • The Tevatron, a similar collider experiment in the USA operating at lower-energies, found direct evidence for the Higgs boson.

      • The Higgs boson was observed in several datasets collected at the LHC



    • The LHC (typically) publishes findings regardless of their statistical significance, i.e., significant results are not selectively reported.

    • The LHC teams are guided by statistical committees, hopefully ensuring good practice

    • The LHC is in principle committed to open data, which means a lot of the data should at some point become public. This is one recommendation for helping the crisis in social sciences.

    • Typical training for experimentalists at the LHC includes basic statistics (although in my experience LHC experimentalits are still subject to the same traps and misinterpretations as everyone else).

    • All members (thousands) of the experimental teams are authors on the papers. The incentive for bad practices such as $p$-hacking is presumably slightly lowered, as you cannot 'discover' a new effect and publish it only under your own name, and have improved job/grant prospects. This incentive might be a factor in the replication crisis in social sciences.

    • All papers are subject to internal review (which I understand to be quite rigorous) as well as external review by a journal

    • LHC analyses are often (I'm not sure who plans or decides this) blinded. This means that the experimentalists cannot tweak the analyses depending on the result. They are 'blind' to the result, make their choices, then unblind it only at the end. This should help prevent $p$-hacking

    • LHC analysis typically (though not always) report a global $p$-value, which has beeen corrected for multiple comparisons (the look-elsewhere effect).

    • The Higgs boson (or similar new physics) was theoretically required due to a 'no-lose' theorem about the breakdown of models without a Higgs at LHC energies, so we can be even more confident that it is a genuine effect.
      The other new effects that are being searched for at the LHC, however, arguably aren't as well motivated, so this doesn't apply to them. E.g., there was no a priori motivation for a 750 GeV resonanace that was hinted at in data but ultimately disappeared.


    If anything, there is a suspicion that the practices at the LHC might even result in the opposite of the 'replication crisis;' analyses that find effects that are somewhat significant might be examined and tweaked until they decrease. In this paper it was argued this was the case for SUSY searches in run-1.






    share|cite|improve this answer











    $endgroup$



    That's a really great question. The 'replication crisis' is that many effects in social sciences (and, although to a lesser extent, other scientific fields) couldn't be reproduced. There are many factors leading to this phenomenon, including




    • Weak standards of evidence, e.g., $2sigma$ evidence required to demonstrate an effect

    • Researchers (subconsciously or otherwise) conducting bad scientific practice by selectively reporting and publishing significant results. E.g. considering many different effects until they find a significant effect or collecting data until they find a significant effect.

    • Poor training in statistical methods.


    I'm not entirely sure about the exact efforts that the LHC experiments are making to ensure that they don't suffer the same problems. But let me say some things that should at least put your mind at ease:




    • Particle physics typically requires a high-standard of evidence for discoveries ($5sigma$). To put that into perspective, the corresponding type-1 error rates are $0.05$ for $2sigma$ and about $3times10^{-7}$ for $5sigma$

    • The results from the LHC are already replicated!


      • There are several detectors placed around the LHC ring. Two of them, called ATLAS and CMS, are general purpose detectors for Standard Model and Beyond the Standard Model physics. Both of them found compelling evidence for the Higgs boson. They are in principle completely independent (though in practice staff switch experiments, experimentalists from each experiment presumably talk and socialize with each other etc, so possibly a very small dependence in analysis choices etc).

      • The Tevatron, a similar collider experiment in the USA operating at lower-energies, found direct evidence for the Higgs boson.

      • The Higgs boson was observed in several datasets collected at the LHC



    • The LHC (typically) publishes findings regardless of their statistical significance, i.e., significant results are not selectively reported.

    • The LHC teams are guided by statistical committees, hopefully ensuring good practice

    • The LHC is in principle committed to open data, which means a lot of the data should at some point become public. This is one recommendation for helping the crisis in social sciences.

    • Typical training for experimentalists at the LHC includes basic statistics (although in my experience LHC experimentalits are still subject to the same traps and misinterpretations as everyone else).

    • All members (thousands) of the experimental teams are authors on the papers. The incentive for bad practices such as $p$-hacking is presumably slightly lowered, as you cannot 'discover' a new effect and publish it only under your own name, and have improved job/grant prospects. This incentive might be a factor in the replication crisis in social sciences.

    • All papers are subject to internal review (which I understand to be quite rigorous) as well as external review by a journal

    • LHC analyses are often (I'm not sure who plans or decides this) blinded. This means that the experimentalists cannot tweak the analyses depending on the result. They are 'blind' to the result, make their choices, then unblind it only at the end. This should help prevent $p$-hacking

    • LHC analysis typically (though not always) report a global $p$-value, which has beeen corrected for multiple comparisons (the look-elsewhere effect).

    • The Higgs boson (or similar new physics) was theoretically required due to a 'no-lose' theorem about the breakdown of models without a Higgs at LHC energies, so we can be even more confident that it is a genuine effect.
      The other new effects that are being searched for at the LHC, however, arguably aren't as well motivated, so this doesn't apply to them. E.g., there was no a priori motivation for a 750 GeV resonanace that was hinted at in data but ultimately disappeared.


    If anything, there is a suspicion that the practices at the LHC might even result in the opposite of the 'replication crisis;' analyses that find effects that are somewhat significant might be examined and tweaked until they decrease. In this paper it was argued this was the case for SUSY searches in run-1.







    share|cite|improve this answer














    share|cite|improve this answer



    share|cite|improve this answer








    edited Mar 28 at 12:57

























    answered Mar 27 at 6:00









    innisfreeinnisfree

    12k33162




    12k33162








    • 21




      $begingroup$
      This is an excellent answer! I think it should be further emphasized how different $2sigma$ is from $5 sigma$. Using the standard $2 sigma$ conventions of social science, you have a 5% chance of getting a significant result every time you test a completely false hypothesis. (And this can easily be boosted by a factor of 10 by $p$-hacking techniques, plus you can report something like $p = 0.1$ as "trending towards significance".) Asking for $5 sigma$ is not merely being $5/2$ as rigorous, the corresponding $p$-value cutoff is roughly $0.0000003$.
      $endgroup$
      – knzhou
      Mar 27 at 10:32








    • 3




      $begingroup$
      I think saying the "social sciences" is possibly a bit overly specific. There's been much talk and news of reproducibility problems in biology and chemistry as well, at least in semi-recent years, though perhaps not as bad as the social sciences are experiencing.
      $endgroup$
      – mbrig
      Mar 27 at 17:05






    • 5




      $begingroup$
      Although it is a slightly different issue than the statistical considerations that are the focus of this answer, laymen also often don't appreciate that the LHC has necessarily reproduced many previous discoveries: atlas.cern/updates/atlas-blog/art-rediscovery . From these and similar studies, we can directly evaluate whether the reproducibility crisis seems to be present in particle physics... and, not surprisingly given the extensive measures described in your answer, it appears that it does better than many (all?) other fields, so far.
      $endgroup$
      – Rococo
      Mar 27 at 17:22








    • 1




      $begingroup$
      A minor addition is that the prior probability for the Higgs boson existing and to a much lesser extent being in the range it was found is likely higher than "surprising" results in social science. Which is just to say it wasn't a surprise that the Higgs boson existed; that's what the theory predicted. Some new non-Higgs particle would warrant much more skepticism.
      $endgroup$
      – Derek Elkins
      Mar 28 at 6:49










    • $begingroup$
      all great points! thanks
      $endgroup$
      – innisfree
      Mar 28 at 8:50














    • 21




      $begingroup$
      This is an excellent answer! I think it should be further emphasized how different $2sigma$ is from $5 sigma$. Using the standard $2 sigma$ conventions of social science, you have a 5% chance of getting a significant result every time you test a completely false hypothesis. (And this can easily be boosted by a factor of 10 by $p$-hacking techniques, plus you can report something like $p = 0.1$ as "trending towards significance".) Asking for $5 sigma$ is not merely being $5/2$ as rigorous, the corresponding $p$-value cutoff is roughly $0.0000003$.
      $endgroup$
      – knzhou
      Mar 27 at 10:32








    • 3




      $begingroup$
      I think saying the "social sciences" is possibly a bit overly specific. There's been much talk and news of reproducibility problems in biology and chemistry as well, at least in semi-recent years, though perhaps not as bad as the social sciences are experiencing.
      $endgroup$
      – mbrig
      Mar 27 at 17:05






    • 5




      $begingroup$
      Although it is a slightly different issue than the statistical considerations that are the focus of this answer, laymen also often don't appreciate that the LHC has necessarily reproduced many previous discoveries: atlas.cern/updates/atlas-blog/art-rediscovery . From these and similar studies, we can directly evaluate whether the reproducibility crisis seems to be present in particle physics... and, not surprisingly given the extensive measures described in your answer, it appears that it does better than many (all?) other fields, so far.
      $endgroup$
      – Rococo
      Mar 27 at 17:22








    • 1




      $begingroup$
      A minor addition is that the prior probability for the Higgs boson existing and to a much lesser extent being in the range it was found is likely higher than "surprising" results in social science. Which is just to say it wasn't a surprise that the Higgs boson existed; that's what the theory predicted. Some new non-Higgs particle would warrant much more skepticism.
      $endgroup$
      – Derek Elkins
      Mar 28 at 6:49










    • $begingroup$
      all great points! thanks
      $endgroup$
      – innisfree
      Mar 28 at 8:50








    21




    21




    $begingroup$
    This is an excellent answer! I think it should be further emphasized how different $2sigma$ is from $5 sigma$. Using the standard $2 sigma$ conventions of social science, you have a 5% chance of getting a significant result every time you test a completely false hypothesis. (And this can easily be boosted by a factor of 10 by $p$-hacking techniques, plus you can report something like $p = 0.1$ as "trending towards significance".) Asking for $5 sigma$ is not merely being $5/2$ as rigorous, the corresponding $p$-value cutoff is roughly $0.0000003$.
    $endgroup$
    – knzhou
    Mar 27 at 10:32






    $begingroup$
    This is an excellent answer! I think it should be further emphasized how different $2sigma$ is from $5 sigma$. Using the standard $2 sigma$ conventions of social science, you have a 5% chance of getting a significant result every time you test a completely false hypothesis. (And this can easily be boosted by a factor of 10 by $p$-hacking techniques, plus you can report something like $p = 0.1$ as "trending towards significance".) Asking for $5 sigma$ is not merely being $5/2$ as rigorous, the corresponding $p$-value cutoff is roughly $0.0000003$.
    $endgroup$
    – knzhou
    Mar 27 at 10:32






    3




    3




    $begingroup$
    I think saying the "social sciences" is possibly a bit overly specific. There's been much talk and news of reproducibility problems in biology and chemistry as well, at least in semi-recent years, though perhaps not as bad as the social sciences are experiencing.
    $endgroup$
    – mbrig
    Mar 27 at 17:05




    $begingroup$
    I think saying the "social sciences" is possibly a bit overly specific. There's been much talk and news of reproducibility problems in biology and chemistry as well, at least in semi-recent years, though perhaps not as bad as the social sciences are experiencing.
    $endgroup$
    – mbrig
    Mar 27 at 17:05




    5




    5




    $begingroup$
    Although it is a slightly different issue than the statistical considerations that are the focus of this answer, laymen also often don't appreciate that the LHC has necessarily reproduced many previous discoveries: atlas.cern/updates/atlas-blog/art-rediscovery . From these and similar studies, we can directly evaluate whether the reproducibility crisis seems to be present in particle physics... and, not surprisingly given the extensive measures described in your answer, it appears that it does better than many (all?) other fields, so far.
    $endgroup$
    – Rococo
    Mar 27 at 17:22






    $begingroup$
    Although it is a slightly different issue than the statistical considerations that are the focus of this answer, laymen also often don't appreciate that the LHC has necessarily reproduced many previous discoveries: atlas.cern/updates/atlas-blog/art-rediscovery . From these and similar studies, we can directly evaluate whether the reproducibility crisis seems to be present in particle physics... and, not surprisingly given the extensive measures described in your answer, it appears that it does better than many (all?) other fields, so far.
    $endgroup$
    – Rococo
    Mar 27 at 17:22






    1




    1




    $begingroup$
    A minor addition is that the prior probability for the Higgs boson existing and to a much lesser extent being in the range it was found is likely higher than "surprising" results in social science. Which is just to say it wasn't a surprise that the Higgs boson existed; that's what the theory predicted. Some new non-Higgs particle would warrant much more skepticism.
    $endgroup$
    – Derek Elkins
    Mar 28 at 6:49




    $begingroup$
    A minor addition is that the prior probability for the Higgs boson existing and to a much lesser extent being in the range it was found is likely higher than "surprising" results in social science. Which is just to say it wasn't a surprise that the Higgs boson existed; that's what the theory predicted. Some new non-Higgs particle would warrant much more skepticism.
    $endgroup$
    – Derek Elkins
    Mar 28 at 6:49












    $begingroup$
    all great points! thanks
    $endgroup$
    – innisfree
    Mar 28 at 8:50




    $begingroup$
    all great points! thanks
    $endgroup$
    – innisfree
    Mar 28 at 8:50











    12












    $begingroup$

    In addition to innisfree's excellent list, there's another fundamental difference between modern physics experiments and human-based experiments: While the latter tend to be exploratory, physics experiments these days are primarily confirmatory.



    In particular, we have theories (sometimes competing theories) that model our idea of how physics works. These theories make specific predictions about the kinds of results we ought to see, and physics experiments are generally then built to discriminate between the various predictions, which are typically either of the form "this effect happens or doesn't" (jet quenching, dispersion in the speed of light due to quantized space), or "this variable has some value" (the mass of the Higgs boson). We use computer simulations to produce pictures of what the results would look like in the different cases and then match the experimental data with those models; nearly always, what we get matches one or the other of the suspected cases. In this way, experimental results in physics are rarely shocking.



    Occasionally, however, what we see is something really unexpected, such as the time OPERA seemed to have observed faster-than-light motion—or, for that matter, Rutherford's gold-foil experiment. In these cases, priority tends to go toward reproducing the effect if possible and explaining what's going on (which usually tends to be an error of some sort, such as the miswired cable in OPERA, but does sometimes reveal something totally new, which then tends to become the subject of intense research itself until the new effect is understood well enough to start making models of it again).






    share|cite|improve this answer









    $endgroup$









    • 1




      $begingroup$
      I understand what you mean, but "match experimental data with models" sounds like there is ample reason to expect confirmation bias if not done properly.
      $endgroup$
      – Scrontch
      Mar 27 at 8:45










    • $begingroup$
      @Scrontch If not done properly, of course, but the useful property of these two questions (yes/no and value-in-range) is that we can run simulations ahead of time and define with clarity what the results should look like in the different possible universes, including such information as how wide the margins need to be to give us confidence. There are (fairly) standard ways of doing this.
      $endgroup$
      – chrylis
      Mar 27 at 20:31
















    12












    $begingroup$

    In addition to innisfree's excellent list, there's another fundamental difference between modern physics experiments and human-based experiments: While the latter tend to be exploratory, physics experiments these days are primarily confirmatory.



    In particular, we have theories (sometimes competing theories) that model our idea of how physics works. These theories make specific predictions about the kinds of results we ought to see, and physics experiments are generally then built to discriminate between the various predictions, which are typically either of the form "this effect happens or doesn't" (jet quenching, dispersion in the speed of light due to quantized space), or "this variable has some value" (the mass of the Higgs boson). We use computer simulations to produce pictures of what the results would look like in the different cases and then match the experimental data with those models; nearly always, what we get matches one or the other of the suspected cases. In this way, experimental results in physics are rarely shocking.



    Occasionally, however, what we see is something really unexpected, such as the time OPERA seemed to have observed faster-than-light motion—or, for that matter, Rutherford's gold-foil experiment. In these cases, priority tends to go toward reproducing the effect if possible and explaining what's going on (which usually tends to be an error of some sort, such as the miswired cable in OPERA, but does sometimes reveal something totally new, which then tends to become the subject of intense research itself until the new effect is understood well enough to start making models of it again).






    share|cite|improve this answer









    $endgroup$









    • 1




      $begingroup$
      I understand what you mean, but "match experimental data with models" sounds like there is ample reason to expect confirmation bias if not done properly.
      $endgroup$
      – Scrontch
      Mar 27 at 8:45










    • $begingroup$
      @Scrontch If not done properly, of course, but the useful property of these two questions (yes/no and value-in-range) is that we can run simulations ahead of time and define with clarity what the results should look like in the different possible universes, including such information as how wide the margins need to be to give us confidence. There are (fairly) standard ways of doing this.
      $endgroup$
      – chrylis
      Mar 27 at 20:31














    12












    12








    12





    $begingroup$

    In addition to innisfree's excellent list, there's another fundamental difference between modern physics experiments and human-based experiments: While the latter tend to be exploratory, physics experiments these days are primarily confirmatory.



    In particular, we have theories (sometimes competing theories) that model our idea of how physics works. These theories make specific predictions about the kinds of results we ought to see, and physics experiments are generally then built to discriminate between the various predictions, which are typically either of the form "this effect happens or doesn't" (jet quenching, dispersion in the speed of light due to quantized space), or "this variable has some value" (the mass of the Higgs boson). We use computer simulations to produce pictures of what the results would look like in the different cases and then match the experimental data with those models; nearly always, what we get matches one or the other of the suspected cases. In this way, experimental results in physics are rarely shocking.



    Occasionally, however, what we see is something really unexpected, such as the time OPERA seemed to have observed faster-than-light motion—or, for that matter, Rutherford's gold-foil experiment. In these cases, priority tends to go toward reproducing the effect if possible and explaining what's going on (which usually tends to be an error of some sort, such as the miswired cable in OPERA, but does sometimes reveal something totally new, which then tends to become the subject of intense research itself until the new effect is understood well enough to start making models of it again).






    share|cite|improve this answer









    $endgroup$



    In addition to innisfree's excellent list, there's another fundamental difference between modern physics experiments and human-based experiments: While the latter tend to be exploratory, physics experiments these days are primarily confirmatory.



    In particular, we have theories (sometimes competing theories) that model our idea of how physics works. These theories make specific predictions about the kinds of results we ought to see, and physics experiments are generally then built to discriminate between the various predictions, which are typically either of the form "this effect happens or doesn't" (jet quenching, dispersion in the speed of light due to quantized space), or "this variable has some value" (the mass of the Higgs boson). We use computer simulations to produce pictures of what the results would look like in the different cases and then match the experimental data with those models; nearly always, what we get matches one or the other of the suspected cases. In this way, experimental results in physics are rarely shocking.



    Occasionally, however, what we see is something really unexpected, such as the time OPERA seemed to have observed faster-than-light motion—or, for that matter, Rutherford's gold-foil experiment. In these cases, priority tends to go toward reproducing the effect if possible and explaining what's going on (which usually tends to be an error of some sort, such as the miswired cable in OPERA, but does sometimes reveal something totally new, which then tends to become the subject of intense research itself until the new effect is understood well enough to start making models of it again).







    share|cite|improve this answer












    share|cite|improve this answer



    share|cite|improve this answer










    answered Mar 27 at 6:31









    chrylischrylis

    22114




    22114








    • 1




      $begingroup$
      I understand what you mean, but "match experimental data with models" sounds like there is ample reason to expect confirmation bias if not done properly.
      $endgroup$
      – Scrontch
      Mar 27 at 8:45










    • $begingroup$
      @Scrontch If not done properly, of course, but the useful property of these two questions (yes/no and value-in-range) is that we can run simulations ahead of time and define with clarity what the results should look like in the different possible universes, including such information as how wide the margins need to be to give us confidence. There are (fairly) standard ways of doing this.
      $endgroup$
      – chrylis
      Mar 27 at 20:31














    • 1




      $begingroup$
      I understand what you mean, but "match experimental data with models" sounds like there is ample reason to expect confirmation bias if not done properly.
      $endgroup$
      – Scrontch
      Mar 27 at 8:45










    • $begingroup$
      @Scrontch If not done properly, of course, but the useful property of these two questions (yes/no and value-in-range) is that we can run simulations ahead of time and define with clarity what the results should look like in the different possible universes, including such information as how wide the margins need to be to give us confidence. There are (fairly) standard ways of doing this.
      $endgroup$
      – chrylis
      Mar 27 at 20:31








    1




    1




    $begingroup$
    I understand what you mean, but "match experimental data with models" sounds like there is ample reason to expect confirmation bias if not done properly.
    $endgroup$
    – Scrontch
    Mar 27 at 8:45




    $begingroup$
    I understand what you mean, but "match experimental data with models" sounds like there is ample reason to expect confirmation bias if not done properly.
    $endgroup$
    – Scrontch
    Mar 27 at 8:45












    $begingroup$
    @Scrontch If not done properly, of course, but the useful property of these two questions (yes/no and value-in-range) is that we can run simulations ahead of time and define with clarity what the results should look like in the different possible universes, including such information as how wide the margins need to be to give us confidence. There are (fairly) standard ways of doing this.
    $endgroup$
    – chrylis
    Mar 27 at 20:31




    $begingroup$
    @Scrontch If not done properly, of course, but the useful property of these two questions (yes/no and value-in-range) is that we can run simulations ahead of time and define with clarity what the results should look like in the different possible universes, including such information as how wide the margins need to be to give us confidence. There are (fairly) standard ways of doing this.
    $endgroup$
    – chrylis
    Mar 27 at 20:31











    6












    $begingroup$

    The paper seems to be a statistical analysis of opinions, and in no way is rigorous enough to raise a question about the LHC. It is statistics about undisclosed statistics.



    Here is a simpler example for statistics of failures: Take an Olympics athlete. How many failures before breaking the record? Is the record not broken because there may have been a thousand failures before breaking it?



    What about the hundreds of athletes who try to reproduce and get a better record? Should they not try?



    The statistics of failed experiments is similar: There is a goal (actually thousands of goals depending on the physics discipline), and a number of trials to reach the goal, though the olympics record analogy should not be taken too far, only to point out the difficulty of combining statistics from a large number of sets. In physics there may be wrong assumptions, blind alleys, logical errors... that may contribute to the failure of reproducibility. The confidence level from statistical and systematic errors are used to define the robustness of a measurement.



    from the question:



    "because 50% of physics & engineering experiments aren't reproducible by the original scientists",



    This is a fake statement from a dubious poll. The statistical significance of the "not reproducible " has not been checked in the poll. Only if it were a one standard deviation result , there exists almost a 50% a probability of the next trial not to reproduce.




    one might expect there's a 50% chance that if the people who originally built the LHC built another LHC, they will not reach the same results




    No way, because engineering and physics analysis at the LHC are over the 4 sigma level, and the probability of negation is small. Even a 3sigma level has confidence 99% , so the chance is in no way 50%.



    We know the LHC results are robust because there are two major and many smaller experiments trying for the same goals. The reason there are two experiments is so that systematic errors in one will not give spurious results. We trust that the measurement statistics that give the end results are correct, as we trust for the record breaking run that the measured times and distances are correct.



    (And LHC is not an experiment. It is where experiments can be carried out depending on the efforts and ingenuity of researchers, it is the field where the Olympics takes place.)



    The robustness of scientific results depends on the specific experimental measurements, not on integrating over all disparate experiments ever made. Bad use of statistics. For statistics of statistics, i.e. the confidence level of the "failed experiments" have to be done rigorously and the paper is not doing that.



    Another way to look at it: If there were no failures , would the experiments mean anything? They would be predictable by pen and paper.






    share|cite|improve this answer











    $endgroup$









    • 11




      $begingroup$
      I'm not sure I buy the Olympics analogy. Failed attempts at breaking a record isn't the same thing as a failed attempt to reproduce an experiment. It also sounds like you are saying we should just cherry pick what does work and ignore when it fails.
      $endgroup$
      – Aaron Stevens
      Mar 27 at 5:14












    • $begingroup$
      @AaronStevens " cherry pick what does work" but is not that evolution in general? and "ignore when it fails" one learns from failure to design better experiments.
      $endgroup$
      – anna v
      Mar 27 at 5:35










    • $begingroup$
      Comments are not for extended discussion; this conversation has been moved to chat.
      $endgroup$
      – ACuriousMind
      Mar 29 at 22:24
















    6












    $begingroup$

    The paper seems to be a statistical analysis of opinions, and in no way is rigorous enough to raise a question about the LHC. It is statistics about undisclosed statistics.



    Here is a simpler example for statistics of failures: Take an Olympics athlete. How many failures before breaking the record? Is the record not broken because there may have been a thousand failures before breaking it?



    What about the hundreds of athletes who try to reproduce and get a better record? Should they not try?



    The statistics of failed experiments is similar: There is a goal (actually thousands of goals depending on the physics discipline), and a number of trials to reach the goal, though the olympics record analogy should not be taken too far, only to point out the difficulty of combining statistics from a large number of sets. In physics there may be wrong assumptions, blind alleys, logical errors... that may contribute to the failure of reproducibility. The confidence level from statistical and systematic errors are used to define the robustness of a measurement.



    from the question:



    "because 50% of physics & engineering experiments aren't reproducible by the original scientists",



    This is a fake statement from a dubious poll. The statistical significance of the "not reproducible " has not been checked in the poll. Only if it were a one standard deviation result , there exists almost a 50% a probability of the next trial not to reproduce.




    one might expect there's a 50% chance that if the people who originally built the LHC built another LHC, they will not reach the same results




    No way, because engineering and physics analysis at the LHC are over the 4 sigma level, and the probability of negation is small. Even a 3sigma level has confidence 99% , so the chance is in no way 50%.



    We know the LHC results are robust because there are two major and many smaller experiments trying for the same goals. The reason there are two experiments is so that systematic errors in one will not give spurious results. We trust that the measurement statistics that give the end results are correct, as we trust for the record breaking run that the measured times and distances are correct.



    (And LHC is not an experiment. It is where experiments can be carried out depending on the efforts and ingenuity of researchers, it is the field where the Olympics takes place.)



    The robustness of scientific results depends on the specific experimental measurements, not on integrating over all disparate experiments ever made. Bad use of statistics. For statistics of statistics, i.e. the confidence level of the "failed experiments" have to be done rigorously and the paper is not doing that.



    Another way to look at it: If there were no failures , would the experiments mean anything? They would be predictable by pen and paper.






    share|cite|improve this answer











    $endgroup$









    • 11




      $begingroup$
      I'm not sure I buy the Olympics analogy. Failed attempts at breaking a record isn't the same thing as a failed attempt to reproduce an experiment. It also sounds like you are saying we should just cherry pick what does work and ignore when it fails.
      $endgroup$
      – Aaron Stevens
      Mar 27 at 5:14












    • $begingroup$
      @AaronStevens " cherry pick what does work" but is not that evolution in general? and "ignore when it fails" one learns from failure to design better experiments.
      $endgroup$
      – anna v
      Mar 27 at 5:35










    • $begingroup$
      Comments are not for extended discussion; this conversation has been moved to chat.
      $endgroup$
      – ACuriousMind
      Mar 29 at 22:24














    6












    6








    6





    $begingroup$

    The paper seems to be a statistical analysis of opinions, and in no way is rigorous enough to raise a question about the LHC. It is statistics about undisclosed statistics.



    Here is a simpler example for statistics of failures: Take an Olympics athlete. How many failures before breaking the record? Is the record not broken because there may have been a thousand failures before breaking it?



    What about the hundreds of athletes who try to reproduce and get a better record? Should they not try?



    The statistics of failed experiments is similar: There is a goal (actually thousands of goals depending on the physics discipline), and a number of trials to reach the goal, though the olympics record analogy should not be taken too far, only to point out the difficulty of combining statistics from a large number of sets. In physics there may be wrong assumptions, blind alleys, logical errors... that may contribute to the failure of reproducibility. The confidence level from statistical and systematic errors are used to define the robustness of a measurement.



    from the question:



    "because 50% of physics & engineering experiments aren't reproducible by the original scientists",



    This is a fake statement from a dubious poll. The statistical significance of the "not reproducible " has not been checked in the poll. Only if it were a one standard deviation result , there exists almost a 50% a probability of the next trial not to reproduce.




    one might expect there's a 50% chance that if the people who originally built the LHC built another LHC, they will not reach the same results




    No way, because engineering and physics analysis at the LHC are over the 4 sigma level, and the probability of negation is small. Even a 3sigma level has confidence 99% , so the chance is in no way 50%.



    We know the LHC results are robust because there are two major and many smaller experiments trying for the same goals. The reason there are two experiments is so that systematic errors in one will not give spurious results. We trust that the measurement statistics that give the end results are correct, as we trust for the record breaking run that the measured times and distances are correct.



    (And LHC is not an experiment. It is where experiments can be carried out depending on the efforts and ingenuity of researchers, it is the field where the Olympics takes place.)



    The robustness of scientific results depends on the specific experimental measurements, not on integrating over all disparate experiments ever made. Bad use of statistics. For statistics of statistics, i.e. the confidence level of the "failed experiments" have to be done rigorously and the paper is not doing that.



    Another way to look at it: If there were no failures , would the experiments mean anything? They would be predictable by pen and paper.






    share|cite|improve this answer











    $endgroup$



    The paper seems to be a statistical analysis of opinions, and in no way is rigorous enough to raise a question about the LHC. It is statistics about undisclosed statistics.



    Here is a simpler example for statistics of failures: Take an Olympics athlete. How many failures before breaking the record? Is the record not broken because there may have been a thousand failures before breaking it?



    What about the hundreds of athletes who try to reproduce and get a better record? Should they not try?



    The statistics of failed experiments is similar: There is a goal (actually thousands of goals depending on the physics discipline), and a number of trials to reach the goal, though the olympics record analogy should not be taken too far, only to point out the difficulty of combining statistics from a large number of sets. In physics there may be wrong assumptions, blind alleys, logical errors... that may contribute to the failure of reproducibility. The confidence level from statistical and systematic errors are used to define the robustness of a measurement.



    from the question:



    "because 50% of physics & engineering experiments aren't reproducible by the original scientists",



    This is a fake statement from a dubious poll. The statistical significance of the "not reproducible " has not been checked in the poll. Only if it were a one standard deviation result , there exists almost a 50% a probability of the next trial not to reproduce.




    one might expect there's a 50% chance that if the people who originally built the LHC built another LHC, they will not reach the same results




    No way, because engineering and physics analysis at the LHC are over the 4 sigma level, and the probability of negation is small. Even a 3sigma level has confidence 99% , so the chance is in no way 50%.



    We know the LHC results are robust because there are two major and many smaller experiments trying for the same goals. The reason there are two experiments is so that systematic errors in one will not give spurious results. We trust that the measurement statistics that give the end results are correct, as we trust for the record breaking run that the measured times and distances are correct.



    (And LHC is not an experiment. It is where experiments can be carried out depending on the efforts and ingenuity of researchers, it is the field where the Olympics takes place.)



    The robustness of scientific results depends on the specific experimental measurements, not on integrating over all disparate experiments ever made. Bad use of statistics. For statistics of statistics, i.e. the confidence level of the "failed experiments" have to be done rigorously and the paper is not doing that.



    Another way to look at it: If there were no failures , would the experiments mean anything? They would be predictable by pen and paper.







    share|cite|improve this answer














    share|cite|improve this answer



    share|cite|improve this answer








    edited Mar 27 at 9:16

























    answered Mar 27 at 5:04









    anna vanna v

    161k8153453




    161k8153453








    • 11




      $begingroup$
      I'm not sure I buy the Olympics analogy. Failed attempts at breaking a record isn't the same thing as a failed attempt to reproduce an experiment. It also sounds like you are saying we should just cherry pick what does work and ignore when it fails.
      $endgroup$
      – Aaron Stevens
      Mar 27 at 5:14












    • $begingroup$
      @AaronStevens " cherry pick what does work" but is not that evolution in general? and "ignore when it fails" one learns from failure to design better experiments.
      $endgroup$
      – anna v
      Mar 27 at 5:35










    • $begingroup$
      Comments are not for extended discussion; this conversation has been moved to chat.
      $endgroup$
      – ACuriousMind
      Mar 29 at 22:24














    • 11




      $begingroup$
      I'm not sure I buy the Olympics analogy. Failed attempts at breaking a record isn't the same thing as a failed attempt to reproduce an experiment. It also sounds like you are saying we should just cherry pick what does work and ignore when it fails.
      $endgroup$
      – Aaron Stevens
      Mar 27 at 5:14












    • $begingroup$
      @AaronStevens " cherry pick what does work" but is not that evolution in general? and "ignore when it fails" one learns from failure to design better experiments.
      $endgroup$
      – anna v
      Mar 27 at 5:35










    • $begingroup$
      Comments are not for extended discussion; this conversation has been moved to chat.
      $endgroup$
      – ACuriousMind
      Mar 29 at 22:24








    11




    11




    $begingroup$
    I'm not sure I buy the Olympics analogy. Failed attempts at breaking a record isn't the same thing as a failed attempt to reproduce an experiment. It also sounds like you are saying we should just cherry pick what does work and ignore when it fails.
    $endgroup$
    – Aaron Stevens
    Mar 27 at 5:14






    $begingroup$
    I'm not sure I buy the Olympics analogy. Failed attempts at breaking a record isn't the same thing as a failed attempt to reproduce an experiment. It also sounds like you are saying we should just cherry pick what does work and ignore when it fails.
    $endgroup$
    – Aaron Stevens
    Mar 27 at 5:14














    $begingroup$
    @AaronStevens " cherry pick what does work" but is not that evolution in general? and "ignore when it fails" one learns from failure to design better experiments.
    $endgroup$
    – anna v
    Mar 27 at 5:35




    $begingroup$
    @AaronStevens " cherry pick what does work" but is not that evolution in general? and "ignore when it fails" one learns from failure to design better experiments.
    $endgroup$
    – anna v
    Mar 27 at 5:35












    $begingroup$
    Comments are not for extended discussion; this conversation has been moved to chat.
    $endgroup$
    – ACuriousMind
    Mar 29 at 22:24




    $begingroup$
    Comments are not for extended discussion; this conversation has been moved to chat.
    $endgroup$
    – ACuriousMind
    Mar 29 at 22:24











    4












    $begingroup$

    Any one experiment is repeated many times on the same equipment. They look for rare events, and it takes a lot of rare events to be sure that they aren't just coincidence.



    The question about how many LHCs it takes to be sure, is different.



    Each LHC component had to be carefully tested to make sure it was in spec. Remember the example of the experiment that seemed to get a result slightly faster than light. Because it was so important, they went to great expense to test everything, components around the world, until they found two components that were out of spec, that created the small error. If the error had been in the other direction would they have done that testing? No. They wouldn't even notice the error. It wouldn't be important. What made this one important was faster than light. Did they carefully record every out-of-spec component they found that would tend to slow the signal, that might cancel the positive errors they found? Maybe. That wasn't what they were looking for, though. That was a complication and not a solution to the problem.



    After the tested LHC components are installed they must be tested again in case they were changed while being handled.



    Then they must be calibrated. Every analog output could have a baseline that's a little bit off, because of random things. A solder joint that's slightly different. An AC circuit nearby that changes things a little bit every 120th of a second. The baseline must be calibrated for every one of them. Once the signal has been converted to digital then it's OK. Errors smaller than the cutoff are ignored, and larger errors make one bit difference. For the calibration, you know what the outcome is supposed to be, so you set it to that.



    Could all this have somehow changed the outcomes so that some extremely unlikely results are falsely reported more often than they should be?



    There's no theoretical reason to expect it. And the engineers who assembled the LHC were very very careful. But how could we test it? The obvious way is to build at least 2 more LHCs and notice how consistent their results are. That would be very expensive. It will not be done.



    We can get some confidence by looking at results from other machinery. It's like -- the LHC was used to scan for a wide range of possible results that could be called the Higgs boson. They could do in years what a lesser machine might take centuries to do. But once we have a specific Higgs boson to look for, some of the others can look for that specifically and see whether they find it. If they do, then there's probably something there beyond equipment error.



    Something else they can do (which I think they are doing part of the time) is look for things that are supposed to not happen that nobody predicts will happen. When they find one for sure then everybody will get excited. People will say there's something wrong, and insist that they check for every possible error that could give them that result. Like with the faster-than-light thing.






    share|cite|improve this answer









    $endgroup$


















      4












      $begingroup$

      Any one experiment is repeated many times on the same equipment. They look for rare events, and it takes a lot of rare events to be sure that they aren't just coincidence.



      The question about how many LHCs it takes to be sure, is different.



      Each LHC component had to be carefully tested to make sure it was in spec. Remember the example of the experiment that seemed to get a result slightly faster than light. Because it was so important, they went to great expense to test everything, components around the world, until they found two components that were out of spec, that created the small error. If the error had been in the other direction would they have done that testing? No. They wouldn't even notice the error. It wouldn't be important. What made this one important was faster than light. Did they carefully record every out-of-spec component they found that would tend to slow the signal, that might cancel the positive errors they found? Maybe. That wasn't what they were looking for, though. That was a complication and not a solution to the problem.



      After the tested LHC components are installed they must be tested again in case they were changed while being handled.



      Then they must be calibrated. Every analog output could have a baseline that's a little bit off, because of random things. A solder joint that's slightly different. An AC circuit nearby that changes things a little bit every 120th of a second. The baseline must be calibrated for every one of them. Once the signal has been converted to digital then it's OK. Errors smaller than the cutoff are ignored, and larger errors make one bit difference. For the calibration, you know what the outcome is supposed to be, so you set it to that.



      Could all this have somehow changed the outcomes so that some extremely unlikely results are falsely reported more often than they should be?



      There's no theoretical reason to expect it. And the engineers who assembled the LHC were very very careful. But how could we test it? The obvious way is to build at least 2 more LHCs and notice how consistent their results are. That would be very expensive. It will not be done.



      We can get some confidence by looking at results from other machinery. It's like -- the LHC was used to scan for a wide range of possible results that could be called the Higgs boson. They could do in years what a lesser machine might take centuries to do. But once we have a specific Higgs boson to look for, some of the others can look for that specifically and see whether they find it. If they do, then there's probably something there beyond equipment error.



      Something else they can do (which I think they are doing part of the time) is look for things that are supposed to not happen that nobody predicts will happen. When they find one for sure then everybody will get excited. People will say there's something wrong, and insist that they check for every possible error that could give them that result. Like with the faster-than-light thing.






      share|cite|improve this answer









      $endgroup$
















        4












        4








        4





        $begingroup$

        Any one experiment is repeated many times on the same equipment. They look for rare events, and it takes a lot of rare events to be sure that they aren't just coincidence.



        The question about how many LHCs it takes to be sure, is different.



        Each LHC component had to be carefully tested to make sure it was in spec. Remember the example of the experiment that seemed to get a result slightly faster than light. Because it was so important, they went to great expense to test everything, components around the world, until they found two components that were out of spec, that created the small error. If the error had been in the other direction would they have done that testing? No. They wouldn't even notice the error. It wouldn't be important. What made this one important was faster than light. Did they carefully record every out-of-spec component they found that would tend to slow the signal, that might cancel the positive errors they found? Maybe. That wasn't what they were looking for, though. That was a complication and not a solution to the problem.



        After the tested LHC components are installed they must be tested again in case they were changed while being handled.



        Then they must be calibrated. Every analog output could have a baseline that's a little bit off, because of random things. A solder joint that's slightly different. An AC circuit nearby that changes things a little bit every 120th of a second. The baseline must be calibrated for every one of them. Once the signal has been converted to digital then it's OK. Errors smaller than the cutoff are ignored, and larger errors make one bit difference. For the calibration, you know what the outcome is supposed to be, so you set it to that.



        Could all this have somehow changed the outcomes so that some extremely unlikely results are falsely reported more often than they should be?



        There's no theoretical reason to expect it. And the engineers who assembled the LHC were very very careful. But how could we test it? The obvious way is to build at least 2 more LHCs and notice how consistent their results are. That would be very expensive. It will not be done.



        We can get some confidence by looking at results from other machinery. It's like -- the LHC was used to scan for a wide range of possible results that could be called the Higgs boson. They could do in years what a lesser machine might take centuries to do. But once we have a specific Higgs boson to look for, some of the others can look for that specifically and see whether they find it. If they do, then there's probably something there beyond equipment error.



        Something else they can do (which I think they are doing part of the time) is look for things that are supposed to not happen that nobody predicts will happen. When they find one for sure then everybody will get excited. People will say there's something wrong, and insist that they check for every possible error that could give them that result. Like with the faster-than-light thing.






        share|cite|improve this answer









        $endgroup$



        Any one experiment is repeated many times on the same equipment. They look for rare events, and it takes a lot of rare events to be sure that they aren't just coincidence.



        The question about how many LHCs it takes to be sure, is different.



        Each LHC component had to be carefully tested to make sure it was in spec. Remember the example of the experiment that seemed to get a result slightly faster than light. Because it was so important, they went to great expense to test everything, components around the world, until they found two components that were out of spec, that created the small error. If the error had been in the other direction would they have done that testing? No. They wouldn't even notice the error. It wouldn't be important. What made this one important was faster than light. Did they carefully record every out-of-spec component they found that would tend to slow the signal, that might cancel the positive errors they found? Maybe. That wasn't what they were looking for, though. That was a complication and not a solution to the problem.



        After the tested LHC components are installed they must be tested again in case they were changed while being handled.



        Then they must be calibrated. Every analog output could have a baseline that's a little bit off, because of random things. A solder joint that's slightly different. An AC circuit nearby that changes things a little bit every 120th of a second. The baseline must be calibrated for every one of them. Once the signal has been converted to digital then it's OK. Errors smaller than the cutoff are ignored, and larger errors make one bit difference. For the calibration, you know what the outcome is supposed to be, so you set it to that.



        Could all this have somehow changed the outcomes so that some extremely unlikely results are falsely reported more often than they should be?



        There's no theoretical reason to expect it. And the engineers who assembled the LHC were very very careful. But how could we test it? The obvious way is to build at least 2 more LHCs and notice how consistent their results are. That would be very expensive. It will not be done.



        We can get some confidence by looking at results from other machinery. It's like -- the LHC was used to scan for a wide range of possible results that could be called the Higgs boson. They could do in years what a lesser machine might take centuries to do. But once we have a specific Higgs boson to look for, some of the others can look for that specifically and see whether they find it. If they do, then there's probably something there beyond equipment error.



        Something else they can do (which I think they are doing part of the time) is look for things that are supposed to not happen that nobody predicts will happen. When they find one for sure then everybody will get excited. People will say there's something wrong, and insist that they check for every possible error that could give them that result. Like with the faster-than-light thing.







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        answered Mar 27 at 17:08









        J ThomasJ Thomas

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