Simultaneous Conjugacy Classes as Combinatorial Invariants of Finite Groups

Abstract

Let G be a finite group. We consider the problem of counting simultaneous conjugacy classes of n-tuples and simultaneous conjugacy classes of commuting n-tuples in G. Let αG,n denote the number of simultaneous conjugacy classes of n-tuples, and βG,n the number of simultaneous conjugacy classes of commuting n-tuples in G. The generating functions AG(t) = Σn≥ 0 αG,ntn, and BG(t) = Σn≥ 0 βG,ntn are rational functions of t. We show that AG(t) determines and is completely determined by the class equation of G. We show that αG,n grows exponentially with growth factor equal to the cardinality of G, whereas βG,n grows exponentially with growth factor equal to the maximum cardinality of an abelian subgroup of G. The functions AG(t) and BG(t) may be regarded as combinatorial invariants of the finite group G. We study dependencies amongst these invariants and the notion of isoclinism for finite groups. We prove that the normalized functions AG(t/|G|) and BG(t/|G|) are invariants of isoclinism families.