You’re sort of right, because remember the Sweden problem. When we asked “what is the probability that I live in Sweden,” using SSA, we didn’t consider alternate earths. And the reason we didn’t consider alternate earths is because we used the information that Sweden exists, and is a country in europe, etc. We made our reference class “humans on this earth.” But if you try to pull those same shenanigans with Sleeping Beauty (if we use the problem statement where there’s a copy of her) and make the reference class “humans who have my memories” you just get an “ERROR = DON’T HAVE COMPLETE INFORMATION ABOUT THIS REFERENCE CLASS.”
But what do you do when you have incomplete information? You use probabilities! So you get some sort of situation where you know that P(copy 1 | tails) = P(copy 2 | tails), but you don’t know about P(heads) and P(tails). And, hm, I think knowing that you’re an observer that exists includes some sneaky connotation about mutual exclusivity and exhaustiveness of all your options.
Hm.
You’re sort of right, because remember the Sweden problem. When we asked “what is the probability that I live in Sweden,” using SSA, we didn’t consider alternate earths. And the reason we didn’t consider alternate earths is because we used the information that Sweden exists, and is a country in europe, etc. We made our reference class “humans on this earth.” But if you try to pull those same shenanigans with Sleeping Beauty (if we use the problem statement where there’s a copy of her) and make the reference class “humans who have my memories” you just get an “ERROR = DON’T HAVE COMPLETE INFORMATION ABOUT THIS REFERENCE CLASS.”
But what do you do when you have incomplete information? You use probabilities! So you get some sort of situation where you know that P(copy 1 | tails) = P(copy 2 | tails), but you don’t know about P(heads) and P(tails). And, hm, I think knowing that you’re an observer that exists includes some sneaky connotation about mutual exclusivity and exhaustiveness of all your options.