In a preceding paper (Minozzo (1999), `Purely game-theoretic random sequences: I. Strong law of large numbers and law of the iterated logarithm'), a definition of typical sequences was given, without using any Kolmogorovian probability distribution P, by applying the principle of the excluded gambling strategy directly to a sequence of measurable functions. In this paper we forward this theory by deriving for these typical sequences some elementary limiting empirical distribution functions, and some strong central limit theorem type results for the coin tossing process.

Purely game-theoretic random sequences: II. Limiting empirical distributions and strong central limit theorem

MINOZZO, Marco
2001-01-01

Abstract

In a preceding paper (Minozzo (1999), `Purely game-theoretic random sequences: I. Strong law of large numbers and law of the iterated logarithm'), a definition of typical sequences was given, without using any Kolmogorovian probability distribution P, by applying the principle of the excluded gambling strategy directly to a sequence of measurable functions. In this paper we forward this theory by deriving for these typical sequences some elementary limiting empirical distribution functions, and some strong central limit theorem type results for the coin tossing process.
2001
Algorithmic probability theory; Almost sure limit theorems; Distributions of the values; Martingales; Typical sequences
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Utilizza questo identificativo per citare o creare un link a questo documento: https://hdl.handle.net/11562/231912
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