Signed Hultman Numbers and Signed Generalized Commuting Probability in Finite Groups

Abstract

Let G be a finite group. Let pi be a permutation from Sn. We study the distribution of probabilities of equality a1 a2 ...an-1an=api1epsilon1 api2epsilon2...apin-1epsilonn-1 apinepsilonn, when pi varies over all the permutations in Sn, and epsiloni varies over the set +1, -1. By the paper "Hultman Numbers and Generalized Commuting Probability in Finite Groups" (2017), The case where all epsiloni are +1 led to a close connection to Hultman numbers. In this paper we generalize the results, permitting epsiloni to be -1. We describe the spectrum of the probabilities of signed permutation equalities in a finite group G. This spectrum turns out to be closely related to the partition of 2n*n! into a sum of the corresponding signed Hultman numbers.