Levy's zero-one law in game-theoretic probability

Shafer, Glenn, Vovk, Vladimir and Takemura, Akimichi

(2009)

Shafer, Glenn, Vovk, Vladimir and Takemura, Akimichi (2009) Levy's zero-one law in game-theoretic probability.

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Abstract

We prove a game-theoretic version of Levy's zero-one law, and deduce several corollaries from it, including non-stochastic versions of Kolmogorov's zero-one law, the ergodicity of Bernoulli shifts, and a zero-one law for dependent trials. Our secondary goal is to explore the basic definitions of game-theoretic probability theory, with Levy's zero-one law serving a useful role.

Information about this Version

This is a Submitted version
This version's date is: 3/5/2009
This item is not peer reviewed

Link to this Version

https://repository.royalholloway.ac.uk/items/38560011-bc56-007f-cf21-2e282411a49c/3/

Item TypeMonograph (Working Paper)
TitleLevy's zero-one law in game-theoretic probability
AuthorsShafer, Glenn
Vovk, Vladimir
Takemura, Akimichi
Uncontrolled Keywordsmath.PR, 60F20
DepartmentsFaculty of Science\Computer Science

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Deposited by Research Information System (atira) on 27-Jan-2013 in Royal Holloway Research Online.Last modified on 27-Jan-2013

Notes

26 pages

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