On semimeasures predicting Martin-Löf random sequences
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Hutter, Marcus
Muchnik, Andrej
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Elsevier
Abstract
Solomonoff’s central result on induction is that the prediction of a universal semimeasure M converges rapidly and with
probability 1 to the true sequence generating predictor µ, if the latter is computable. Hence, M is eligible as a universal sequence
predictor in the case of unknown µ. Despite some nearby results and proofs in the literature, the stronger result of convergence
for all (Martin-Lof) random sequences remained open. Such a convergence result would be particularly interesting and natural, ¨
since randomness can be defined in terms of M itself. We show that there are universal semimeasures M which do not converge
to µ on all µ-random sequences, i.e. we give a partial negative answer to the open problem. We also provide a positive answer
for some non-universal semimeasures. We define the incomputable measure D as a mixture over all computable measures and the
enumerable semimeasure W as a mixture over all enumerable nearly measures. We show that W converges to D and D to µ on all
random sequences. The Hellinger distance measuring closeness of two distributions plays a central role.
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Theoretical Computer Science