论文信息 - Elementary Proof of a Theorem of Jean Ville

Elementary Proof of a Theorem of Jean Ville

Considerable thought has been devoted to an adequate definition of the class of infinite, random binary sequences (the sort of sequence that almost certainly arises from flipping a fair coin indefinitely). The first mathematical exploration of this problem was due to R. Von Mises, and based on his concept of a "selection function." A decisive objection to Von Mises' idea was formulated in a theorem offered by Jean Ville in 1939. It shows that some sequences admitted by Von Mises as "random" in fact manifest a certain kind of systematicity. Ville's proof is challenging, and an alternative approach has appeared only in condensed form. We attempt to provide an expanded version of the latter, alternative argument.

Daniel N. Osherson | Scott Weinstein | Elliott H. Lieb

[1] Michiel van Lambalgen,et al. UvA-DARE ( Digital Academic Repository ) Randomness and Foundations of Probability : Von Mises ' Axiomatization of Random Sequences , 2022 .

[2] V. Uspenskii,et al. Can an individual sequence of zeros and ones be random? Russian Math , 1990 .

[3] Feller William,et al. An Introduction To Probability Theory And Its Applications , 1950 .

[4] D. Loveland. A New Interpretation of the von Mises' Concept of Random Sequence† , 1966 .

[5] R. Mises. Grundlagen der Wahrscheinlichkeitsrechnung , 1919 .

[6] B. Harshbarger. An Introduction to Probability Theory and its Applications, Volume I , 1958 .

[7] Jean-Luc Ville. Étude critique de la notion de collectif , 1939 .

[8] William Feller,et al. An Introduction to Probability Theory and Its Applications , 1967 .

[9] Ming Li,et al. An Introduction to Kolmogorov Complexity and Its Applications , 2019, Texts in Computer Science.

[10] Michiel van Lambalgen,et al. Von Mises' Definition of Random Sequences Reconsidered , 1987, J. Symb. Log..

[11] Erhard Tornier,et al. Grundlagen der Wahrscheinlichkeitsrechnung , 1933 .