Argthtjtr

I've been playing a simplified variant of The Great Elf Game for a few days now and I'm struggling to identify an optimal strategy.

Rules:

• You start with 12 elves. Each elf is sent to gather a tree each day.




• You can choose to send one (or more) elves to each of the Woods, the Deep Forest or the Mountains.




• Elves will collect one tree per turn. Trees from the Woods are worth £10, trees from the Deep Forest are worth £20 and trees from the Mountains are worth £50.




• A new elf can be bought at the start of a turn for £75.




• Each turn a random number is generated and there's a 1/3 chance of a blizzard. If a blizzard occurs, elves in the Woods will collect trees as normal, elves in the Deep Forest will return empty-handed and elves in the Mountain will die.




• The Winner is the team with the most money at the end of 24 days.

Obviously the highest risk/reward strategy is to simply send all my elves to the Mountain (and hope like hell that the weather stays good) but is there an optimal strategy I can use to maximise my chances of winning over a thousand games?

There are two factors to think about here: Where do you send the elves, and when do you buy new elves?

I think you can optimize by looking at the expected value of each decision.

Woods

E(Woods): $10 per elf per day

Note: an elf pays for itself (turns profit for priceof $75) after 8 days.

Deep Forest:

E(T): $20*(2/3)+ $0*(1/3) = $13.33 per elf per day

An elf pays for itself after 6 days.

Mountain:

E(M): $50*(2/3) +($-75)*(1/3) = $8.33 per elf per day if replacing elf

An elf pays for itself after 9 days.
OR

$33.33 - (1/3) *(max expected profit per elf per day)*(days remaining)
if elf is not replaced. This is only a better option if there are 1 or less days remaining. ie, only on the last day


This tells us that we should start by sending all the elves to the deep forest every day, then buy as many elves as we can with the profit up until the end of day 18 (6 days left). From day 19-23 send all the elves to the deep forest, and keep the profit, new elves wont be profitable now. Then, on day 24, take a gamble and send them all to the mountains. Since this is the last day, the expected value becomes $33.33 - (1/3) * ($13.33)*(1) = $20

To summarize:

Days 1-18: send all to Forest, buy max elves

Days 19-23: Send all to Forest, buy no elves

Days 24: Send all to mountains

How long shopuld I buy elves?

Calculate the expected net worth of a sort of elf after a given day d

A WOOD ELF is worth $$$10*(24-d)-$75 $$
A FOREST ELF is worth $$$20*(24-d)*1/3-$75 $$
A MOUNTAIN ELF is worth $$$50*sum_{n=1}^{24-d}frac{2}{3}^{n}-$75 $$

If you calculate this for every day you get the following:

- Wood elves have a positive net worth until day 17

- Forest elves have a positive net worth until day 19

- Mountain elves have a positive net worth until day 21

=>buy elves including on day 21

Where should I send my elves?

Calculate the Profit on a given day d

A WOOD ELF produces $$$10 $$
A FOREST ELF produces $$$20 $$
A MOUNTAIN ELF produces $$$50*frac{2}{3}-frac{1}{3}(w_r) $$
with w_r=rest worth of the elf, which is the maximum worth of the three strategies on that day

Calculating this gives us:

- Forest elves are more profitable than mountain elves until day 21

=>send elves in the forest including day 21, then send them into the mountains

I also did a quick simulation on this, which confirms ~$25785 expected after 24 days as the maximum with above mentioned strategy

Woods gives you 10 each day, so the expectation value there is pretty simple. Deep Woods isn't much more complicated; that gives 20 two-thirds of the times, for 40/3. Mountains, though, are much more complicated. The expectation value there is 100/3, but that's the gross amount. You're losing an elf, and the elf's replacement value is 75. If we subtract that from 100, we get 25, giving 25/3.

However, the replacement value isn't always relevant. If we use the value of 100/3 = 33.33, that means that an elf takes over two days to make back their cost. So we don't want to buy any elves when there are fewer than three days remaining. On the last day, going by expectation values the best strategy is clearly to go Mountain (it doesn't matter if they die, since they aren't getting any more trees even if they survive). Since on the last day, an elf has an expectation value of 33, we should subtract that from 100 to find the Mountain expectation value on the second to last day. That gives (100-33)/3, or about 22, which is larger than Deep Woods. Thus, at the beginning second to last day, the expected money from each elf for the next two days is 33+22=55. Thus, the expectation value for Mountain on the third to last day is (100-55)/3, or about 14.8, which is still larger than for Deep Forest. For the fourth to day, we have (100-(33+22+15))/3 = 9.87, which is lower than Deep Forest. So we should send the elves to the Deep Forest up until the third to last day, then send them to Mountain for the last three days.

Now, when should we stop buying elves? Well, the expectation value of elves at the beginning of the third day is 70, so we shouldn't buy any elves then. But at the beginning of the fourth to last day, the value is 84, so we should buy them.

All of this is based on expectation value calculations. However, if your goal is maximize the probability of having the highest amount, rather than maximizing your expected value, then the calculation is more complicated. Then it depends on how many other players there are, and what their strategies are. If everyone else are going for the above strategy, then you'll all be tied at the beginning of the fourth to last day. So it would be a good idea to send all your elves to Mountain then: you'll have a one third chance of dropping to last place, and a two thirds chance of jumping ahead of everyone else.