you don't just care about one particular possible world where things happen to turn out exactly the way you want.
Presumably there are infinitely many possible worlds where things happen to turn out exactly the way I want: I care about some small finite subset of the world, and the rest is allowed to vary. Why should I expend energy worrying about one particular infinity of worlds that are hard to optimize when I have already got infinitely many where I win easily or by default?
There are presumably also infinitely many possible worlds where all varieties of bizarre decision/action algorithms are the way to win. For example, the world where the extent to which your preferences get satisfied is determined by what fraction of your skin is covered in red body paint, etc, etc.
Also, there are other classes of worlds where I lose: for example, anti-inductive worlds. Why should I pay special attention to the worlds that loosely obey the occam/complexity prior?
Perhaps I could frame it this way: the complexity prior is (in fact) counterintuitive and alien to the human mind. Why should I pay special attention to worlds that conform to it (simple worlds)?
The answer I used to have was "because it works", which seemed to cache out as
"if I use a complexity prior to repeatedly make decisions, then my subjective experience will be (mostly) of winning"
which I used to think was because the Real world that we live in is, in fact, a simple one, rather than a wishful-thinking one, a red-body-paint one, or an anti-inductive one.
It sounds like you're assuming that people use a wishful-thinking prior by default, and have to be argued into a complexity-based prior. This seems implausible to me.
I think the phenomenon of wishful thinking doesn't come from one's prior, but from evolution being too stupid to design a rational decision process. That is, a part of my brain rewards me for increasing the anticipation of positive future experiences, even if that increase is caused by faulty reasoning instead of good decisions. This causes me to engage in wishful thinking (i.e., miscalculati...
In Probability Space & Aumann Agreement, I wrote that probabilities can be thought of as weights that we assign to possible world-histories. But what are these weights supposed to mean? Here I’ll give a few interpretations that I've considered and held at one point or another, and their problems. (Note that in the previous post, I implicitly used the first interpretation in the following list, since that seems to be the mainstream view.)
As you can see, I think the main problem with all of these interpretations is arbitrariness. The unconditioned probability mass function is supposed to represent my beliefs before I have observed anything in the world, so it must represent a state of total ignorance. But there seems to be no way to specify such a function without introducing some information, which anyone could infer by looking at the function.
For example, suppose we use a universal distribution, where we believe that the world-history is the output of a universal Turing machine given a uniformly random input tape. But then the distribution contains the information of which UTM we used. Where did that information come from?
One could argue that we do have some information even before we observe anything, because we're products of evolution, which would have built some useful information into our genes. But to the extent that we can trust the prior specified by our genes, it must be that evolution approximates a Bayesian updating process, and our prior distribution approximates the posterior distribution of such a process. The "prior of evolution" still has to represent a state of total ignorance.
These considerations lead me to lean toward the last interpretation, which is the most tolerant of arbitrariness. This interpretation also fits well with the idea that expected utility maximization with Bayesian updating is just an approximation of UDT that works in most situations. I and others have already motivated UDT by considering situations where Bayesian updating doesn't work, but it seems to me that even if we set those aside, there is still reason to consider a UDT-like interpretation of probability where the weights on possible worlds represent how much we care about those worlds.