The Euler characteristic of an endotrivial complex

Abstract

Let G be a finite group and k a field of prime characteristic p. We examine the Lefschetz homomorphism : Ek(G) O(T(kG)) from the group of endotrivial complexes, i.e. the Picard group of the bounded homotopy category of p-permutation modules Kb(kGtriv), to the orthogonal unit group of the Grothendieck group of Kb(kGtriv), i.e. the trivial source ring. When p = 2 and k = F2, is surjective when G has a Sylow 2-subgroup with fusion controlled by its normalizer, and when G has dihedral Sylow 2-subgroups. When p is odd, is surjective if G has a cyclic Sylow p-subgroup or is p-nilpotent, but we exhibit examples of groups of p-rank 2 or greater for which is not surjective. We also examine the kernel of the Lefschetz homomorphism, determining it for all groups when p = 2 and for groups with cyclic Sylow p-subgroups when p is odd.