This result features in the paper by Piccione and Rubeinstein that introduced the absent-minded driver problem [1].
Philosophers like decision theories that self-ratify, and this is indeed a powerful self-ratification principle.
This self-ratification principle does however rely on SIA probabilities assuming the current policy. We have shown that conditioning on your current policy, you will want to continue on with your current policy. i.e. the policy will be a Nash Equilibrium. There can be Nash Equilibria for other policies π′ however. The UDT policy will by definition equal or beat these from the ex ante point of view. However, others can achieve higher expected utility conditioning on the initial observation i.e. higher SIAπ′(s|o)Qπ′(s,a). This apparent paradox is discussed in [2] [3], and seems to reduce to disagreement over counterfactual mugging.
So why do we like the UDT solution over solutions that are more optimal locally, and that also locally self-ratify? Obviously we want to avoid resorting so circular reasoning (i.e. it gets the best utility ex ante). I think there are some okay reasons:
i) it is reflectively stable (i.e. will not self-modify, will not hide future evidence) and
ii) it makes sense assuming modal realism or many worlds interpretation (then we deem it parochial to focus on any reference frame other than equal weighting across the whole wavefunction/universe)
iii) it makes sense if we assume that self-location somehow does not
iv) it’s simpler (utility function given weighting 1 across all worlds). In principle, UDT can also include the locally optimal
v) it transfers better to scenarios without randomization as in Nate + Ben Levenstein’s forthcoming [4].
I imagine there are more good arguments that I don’t yet know.
p19 Piccione, Michele, and Ariel Rubinstein. “On the interpretation of decision problems with imperfect recall.” Games and Economic Behavior 20.1 (1997): 3-24.
Schwarz, Wolfgang. “Lost memories and useless coins: revisiting the absentminded driver.” Synthese 192.9 (2015): 3011-3036.
This result features in the paper by Piccione and Rubeinstein that introduced the absent-minded driver problem [1].
Philosophers like decision theories that self-ratify, and this is indeed a powerful self-ratification principle.
This self-ratification principle does however rely on SIA probabilities assuming the current policy. We have shown that conditioning on your current policy, you will want to continue on with your current policy. i.e. the policy will be a Nash Equilibrium. There can be Nash Equilibria for other policies π′ however. The UDT policy will by definition equal or beat these from the ex ante point of view. However, others can achieve higher expected utility conditioning on the initial observation i.e. higher SIAπ′(s|o)Qπ′(s,a). This apparent paradox is discussed in [2] [3], and seems to reduce to disagreement over counterfactual mugging.
So why do we like the UDT solution over solutions that are more optimal locally, and that also locally self-ratify? Obviously we want to avoid resorting so circular reasoning (i.e. it gets the best utility ex ante). I think there are some okay reasons:
i) it is reflectively stable (i.e. will not self-modify, will not hide future evidence) and ii) it makes sense assuming modal realism or many worlds interpretation (then we deem it parochial to focus on any reference frame other than equal weighting across the whole wavefunction/universe) iii) it makes sense if we assume that self-location somehow does not iv) it’s simpler (utility function given weighting 1 across all worlds). In principle, UDT can also include the locally optimal v) it transfers better to scenarios without randomization as in Nate + Ben Levenstein’s forthcoming [4].
I imagine there are more good arguments that I don’t yet know.
p19 Piccione, Michele, and Ariel Rubinstein. “On the interpretation of decision problems with imperfect recall.” Games and Economic Behavior 20.1 (1997): 3-24.
Schwarz, Wolfgang. “Lost memories and useless coins: revisiting the absentminded driver.” Synthese 192.9 (2015): 3011-3036.
http://lesswrong.com/lw/3dy/has_anyone_solved_psykoshs_nonanthropic_problem/
Cheating Death in Damascus / Nate Soares and Ben Levenstein / Forthcoming