Representation growth of maximal class groups: various exceptional cases

Abstract

This paper is a sequel to "Representation growth of maximal class groups: non-exceptional primes". We use a constructive method to calculate some exceptional cases of p-local representation zeta functions of a family of finitely generated nilpotent groups Mn with maximal nilpotency class. Using the machinery of the constructive method from the prequel paper we construct all irreducible representations of degree pN for all N∈ N for the group Mp+1 for a fixed prime p. We also construct all irreducible representations of degree 2N for the group M4. Together with the main result from the prequel, this gives us a complete understanding of the irreducible representations of the groups M3 and M4, along with their global representation zeta functions.