On the common transversal probability in finite groups

Abstract

Let G be a finite group, and let H be a subgroup of G. We compute the probability, denoted by PG(H), that a left transversal of H in G is also a right transversal, thus a two-sided one. Moreover, we define, and denote by tp(G), the common transversal probability of G to be the minimum, taken over all subgroups H of G, of PG(H). We prove a number of results regarding the invariant tp(G), like lower and upper bounds, and possible values it can attain. We also show that tp(G) determines structural properties of G. Finally, several open problems are formulated and discussed.