This article is cited in 2 papers

Mathematics

Algebras of Bernoulli distributions with a single limit point

A. D. Yashunskii

Keldysh Institute of Applied Mathematics of Russian Academy of Sciences, Moscow

Abstract: We consider systems of Boolean functions inducing algebras of Bernoulli distributions, whose universal set has a single limit point. We establish a criterion for an algebra generated by a given set of distributions to have a unique limit point.

Key words: random variable, Bernoulli distribution, Boolean function, limit point.

UDC: 519.7+512.57

Received: 11.07.2018

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