The Computation of Fourier transforms on $SL2(Z/pnZ) and related numerical experiments

Abstract

We detail an explicit construction of ordinary irreducible representations for the family of finite groups SL2( Z /pn Z) for odd primes p and n≥ 2. For n=2, the construction is a complete set of irreducible complex representations, while for n>2, all but a handful are obtained. We also produce an algorithm for the computation of a Fourier transform for a function on SL2( Z /p2 Z). With this in hand we explore the spectrum of a collection of Cayley graphs on these groups, extending analogous computations for Cayley graphs on SL2( Z/p Z) and suggesting conjectures for the expansion properties of such graphs.