On a characterization of idempotent distributions on discrete fields and on the field of p-adic numbers

Abstract

We prove the following theorem. Let X be a discrete field, and η be independent identically distributed random variables with values in X and distribution μ. The random variables S=+η and D=(-η)2 are independent if and only if μ is an idempotent distribution. A similar result is also proved in the case when and η are independent identically distributed random variables with values in the field of p-adic numbers Qp, where p>2, assuming that the distribution μ has a continuous density.