According to the self-indication assumption, my program needs to do an extra step to be a proper representation. After it generates a list of math problems, it needs to then choose a second random number, X, and present me with a math problem only if there's a math problem numbered X. In this case, being presented with a math problem or not does tell me something about W - I have a much higher chance of getting a math problem if W=2 and a much lower chance if W=0 - and finding out that the one math problem I was presented with was P(50) tells me much more about X than it does about W.

That is not how I would describe SIA in terms of your setup. I would model SIA in this way:

The program starts by generating three pairwise-disjoint lists of math problems: a short list of length 10^(3*0), a medium list of length 10^(3*1), and a long list of length 10^(3*2). The program then chooses a problem P at random from the union of these three lists, and then presents the problem to you. Let W be such that P was on the list of length 10^(3*W). Now, whatever P you get, P was more likely to appear on a longer list than on a shorter list. Therefore, being presented with P makes it more likely that W was larger than that W was smaller.

In contrast, under SSA, the program, having generated the three pairwise-disjoint lists, chooses a number W at random from {0,1,2}, and then presents you with a random problem P from the list of length 10^(3*W).

In general, the distinction between SIA and SSA is this:

• Under SIA, the program first chooses an individual at random from among all possible individuals. (Distinct worlds contain disjoint sets of individual.) The world containing the chosen individual is "the actual world". Note that this selection process yields a prior probability distribution for the number of individuals in the actual world, and this prior distribution favors larger values. The program then reports the experience of the chosen individual to you. You then use the fact that the program selected an individual with this experience to get a posterior probability distribution for the number of individuals in the actual world. But you are updating a prior distribution that favored larger worlds.

• Under SSA, the program first chooses a world at random from among all possible worlds. The chosen world is "the actual world". Note that this selection process shows no favor to larger worlds as such. Then the program chooses an individual at random from among the individuals within the actual world. The program then reports the experience of the chosen individual to you. You then use the fact that the program selected an individual with this experience to get a posterior probability distribution for the number of individuals in the actual world. But you are updating a prior distribution that did not favor larger worlds as such.

It then chooses a random math problem from P and presents it to me, without telling me what the problem number is for that particular math problem.

In the scenario you describe, you know at the outset that there is only one copy of you. To be able to apply anthropic assumptions like SIA and SSA, you would need to amend the scenario so that there are multiple 'copies' of you.

Rather than generating 10^(3W) random simple math problems and having a random one shown to you, say you arrange for 10^(3W) copies of yourself to be created. And then let each copy be shown a different math problem.

Then SSA says that, upon finding yourself looking at a math problem, you learn nothing at all about W, whereas SIA says you need to multiply your prior odds by 1:1000:1000000.

An interesting variation to consider is where 10^6 copies of you are created, and then 10^(3W) of them are chosen at random to be shown a math problem. Then to be able to apply SSA, you need to decide whether to regard yourself as (i) a random person or (ii) a random person-who-received-a-math-problem. If (i) then SSA and SIA will both recommend updating your odds as above. If (ii) then SSA says you learn nothing whereas SIA recommends that you update your odds. (SSA cares about the reference class whereas SIA doesn't.)

Perhaps the purpose of your 'model' of SIA is precisely to find a way of understanding it without bringing in multiple observers or 'copies'. To be honest, I don't think this makes much sense (like trying to explain relativity without reference to space or time (or spacetime)).