Ergodicity of power series-map on the simplex of group algebra of a finite group

Abstract

A finite group G, its group algebra R[G] over the field of real numbers, any power series p(t)= a0+a1t+ a2t2+ ..., where ai ≥ 0, and a0+a1+ a2+...= 1, and simplex S= \x=Σg∈ Gxgg∈ R[G]: Σg∈ Gxg=1, xg≥ 0 for any g∈ G \ are considered. Ergodicity of the map p: S S, where p(x)= a0+a1x+ a2x2+ >... for x∈ S, on S is shown. The regularity of this map at a given point x∈ S is investigated as well.

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