The classification of endotrivial complexes

Abstract

Let G be a finite group and k a field of prime characteristic p. We give a complete classification of endotrivial complexes, i.e. determine the Picard group Ek(G) of the tensor-triangulated category Kb(kGtriv), the bounded homotopy category of p-permutation modules, which Balmer and Gallauer recently considered. For p-groups, we identify Ek(-) with the rational p-biset functor CFb(-) of Borel-Smith functions and recover a short exact sequence of rational p-biset functors constructed by Bouc and Yalcin. As a consequence, we prove that every p-permutation autoequivalence of a p-group arises from a splendid Rickard autoequivalence. Additionally, we give a positive answer to a question of Gelvin and Yalcin, showing the kernel of the Bouc homomorphism for an arbitrary finite group G is described by superclass functions f: sp(G) Z satisfying the oriented Artin-Borel-Smith conditions.