Elusive groups from non-split extensions

Abstract

A finite transitive permutation group is elusive if it contains no derangements of prime order. These groups are closely related to a longstanding open problem in algebraic graph theory known as the Polycirculant Conjecture, which asserts that no elusive group is 2-closed. Existing constructions of elusive groups mostly arise from split extensions. In this paper, we initiate the construction of elusive groups via non-split extensions. As a demonstration, we construct elusive groups of new degrees, namely p3k-4(p+1)/2 for each Mersenne prime p≥7 and integer k≥2. We also construct the first examples of elusive groups with odd degree, namely 3k+1·52, and twice odd degree, namely 2·3k + 1·52 for each k≥1. We conclude by proposing further problems to advance this new direction of research.