The integer group determinants for GA(1,p) and related semidirect products

Abstract

We consider the integer group determinants for groups that are semidirect products of Zp and Zn with p prime and n p-1. We give a complete description of the integer group determinants for the general affine groups of degree one GA(1,p) when p=5,7,11 and 23, and for Z7 Z3, Z11 Z5 and Z13 Z6, showing that the obvious divisibility and congruence conditions arising from the form of the group determinant when n=p-1 or 12(p-1), can be sufficient as well as necessary for these types of groups (although in the latter case we must work with norms of integers in a quadratic field). For p=13 this also happens for the remaining groups of this type, Z135 Z4 and Z13 Z3, (working in an appropriate cubic and quartic field).