I guess my point is that it is nonsensical to ask “what does UDT do in situation X” without also specifying the prior over possible universes that this particular UDT is using. Given that this is the case, what exactly do you mean by “losing game X”?
Well, you can talk about “what does decision theory W do in situation X” without specifying the likelyhood of other situations, by assuming that all agents start with a prior that sets P(X) = 1. In that case UDT clearly wins the anti-newcomb scenario because it knows that actual newcomb’s “never happens” and therefore it (counterfactually) two-boxes.
The only problem with this treatment is that in real life P(anti-newcomb) = 1 is an unrealistic model of the world, and you really should have a prior for P(anti-newcomb) vs P(newcomb). A decision theory that solves the restricted problem is not necessarily a good one for solving real life problems in general.
Well, perhaps. I think that the bigger problem is that under reasonable priors P(Newcomb) and P(anti-Newcomb) are both so incredibly small that I would have trouble finding a meaningful way to approximate their ratio.
How confident are you that UDT actually one-boxes?
Also yeah, if you want a better scenario where UDT loses see my PD against 99% prob. UDT and 1% prob. CDT example.
I guess my point is that it is nonsensical to ask “what does UDT do in situation X” without also specifying the prior over possible universes that this particular UDT is using. Given that this is the case, what exactly do you mean by “losing game X”?
Well, you can talk about “what does decision theory W do in situation X” without specifying the likelyhood of other situations, by assuming that all agents start with a prior that sets P(X) = 1. In that case UDT clearly wins the anti-newcomb scenario because it knows that actual newcomb’s “never happens” and therefore it (counterfactually) two-boxes.
The only problem with this treatment is that in real life P(anti-newcomb) = 1 is an unrealistic model of the world, and you really should have a prior for P(anti-newcomb) vs P(newcomb). A decision theory that solves the restricted problem is not necessarily a good one for solving real life problems in general.
Well, perhaps. I think that the bigger problem is that under reasonable priors P(Newcomb) and P(anti-Newcomb) are both so incredibly small that I would have trouble finding a meaningful way to approximate their ratio.
How confident are you that UDT actually one-boxes?
Also yeah, if you want a better scenario where UDT loses see my PD against 99% prob. UDT and 1% prob. CDT example.