On the number of epi-, mono-, and homomorphisms of groups

Abstract

It is known that the number of homomorphisms from a group F to a group G is divisible by the greatest common divisor of the order of G and the exponent of F/[F,F]. We investigate the number of homomorphisms satisfying some natural conditions such as injectivity or surjectivity. The simplest nontrivial corollary of our results is the following fact: in any finite group, the number of generating pairs (x,y) such that x3=1=y5, is a multiple of the greatest common divisor of 15 and the order of the group [G,G]·\g15\;|\;g∈ G\.