Local Conjugacy in GL2(Z/p2Z)

Abstract

Subgroups H1 and H2 of a group G are said to be locally conjugate if there is a bijection f: H1 → H2 such that h and f(h) are conjugate in G for every h ∈ H1. This paper studies local conjugacy among subgroups of GL2(Z/p2Z), where p is an odd prime, building on Sutherland's categorizations of subgroups of GL2(Z/pZ) and local conjugacy among them. There are two conditions that locally conjugate subgroups H1 and H2 of GL2(Z/p2Z) must satisfy: letting : GL2(Z/p2Z) → GL2(Z/pZ) be the natural homomorphism, H1 and H2 must be locally conjugate in GL2(Z/p2Z) and (H1) and (H2) must be locally conjugate in GL2(Z/pZ). To identify H1 and H2 up to conjugation, we choose (H1) and (H2) to be similar to each other, then understand the possibilities for H1 and H2 . This study fully categorizes local conjugacy in GL2(Z/p2Z) through such casework.