The reason why this doesn’t work (for coins) is that (when MWI is true) A=”my observation is heads” implies B=”some Y observes heads”, but not the other way around. So P(B|A)=1, but P(A|B) = p, and after plugging that into the Bayes formula we have P(MWI|A) = P(Copenhagen|A).
Can you translate that to the quantum suicide case?
The reason why this doesn’t work (for coins) is that (when MWI is true) A=”my observation is heads” implies B=”some Y observes heads”, but not the other way around. So P(B|A)=1, but P(A|B) = p, and after plugging that into the Bayes formula we have P(MWI|A) = P(Copenhagen|A).
Can you translate that to the quantum suicide case?