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On Necessary Conditions of Probability Limit Theorems in Finite Algebras

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Abstract

We consider the conditions for a finite set with a given system of operations (a finite algebra) to be subject to a probability limit theorem, i.e., arbitrary computations with mutually independent random variables have value distributions that tend to a certain limit (limit law) as the number of random variables used in the computation grows. Such behavior may be seen as a generalization of the central limit theorem that holds for sums of continuous random variables. We show that the existence of a limit probability law in a finite algebra has strong implications for its set of operations. In particular, with some geometric exceptions excluded, the existence of a limit law without zero components implies that all operations in the algebra are quasigroup operations and the limit law is uniform.

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Authors and Affiliations

  1. Federal Research Center Keldysh Institute of Applied Mathematics, Russian Academy of Sciences, 125047, Moscow, Russia

    A. D. Yashunsky

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  1. A. D. Yashunsky
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Correspondence to A. D. Yashunsky.

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Translated by I. Ruzanova

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Yashunsky, A.D. On Necessary Conditions of Probability Limit Theorems in Finite Algebras. Dokl. Math. 102, 301–303 (2020). https://doi.org/10.1134/S1064562420040213

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  • DOI: https://doi.org/10.1134/S1064562420040213

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