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Independent random variables on Abelian groups with independent the sum and difference

Published 2015-10-16Version 1

Let X be a second countable locally compact Abelian group. Let $\xi_1, \xi_2$ be independent random variables with values in the group X and distributions $\mu_1, \mu_2$ such that the sum $\xi_1+\xi_2$ and the difference $\xi_1-\xi_2$ are independent. Assuming that the connected component of zero of the group $X$ contains a finite number elements of order 2 we describe the possible distributions $\mu_k$.

Categories: math.PR

Keywords: independent random variables, difference, second countable locally compact abelian, finite number elements, countable locally compact abelian group

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