Units in Blocks of Defect 1 and the Zassenhaus Conjecture

Abstract

Building on previous work by Caicedo and the second author, we develop a method that decides the existence of units of finite order in blocks of Zp G of defect 1. This allows us to prove that if p is a prime and G is a finite group whose Sylow p-subgroup has order p, then any unit u∈ Z G of order p is conjugate to an element of G. This is a special case of the Zassenhaus conjecture. We also prove some new results on units of finite order in Z PSL(2,q) for certain q, and construct a unit of order 15 in V(Z(3,5)PSL(2,16)) which is a 3- and 5-local counterexample to the Zassenhaus conjecture, raising the hope that our methods may lead to a global counterexample amongst simple groups.

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