Random walks on a finite group and the Frobenius-Schur theorem

Abstract

We consider random walk on a finite group G as follows. We can consider G as a group of substitutions. Randomly (i.e. with probability U(g)=|G|-1 ) we choose a substitution g ∈ G and execute it twice in a row, i.e. execute a substitution g2 ∈ G . Then the set of squares of elements of the group G be a carrier of a probability P(g)=r(g)|G|\ (g ∈ G) , where r(g) is a number of elements h ∈ G such that h2 = g . Using well-known Frobenius-Schur theorem we find speed of convergence of n-fold convolution of P to the uniform probability U and conditions for the convergence.