Endotrivial complexes

Abstract

Let G be a finite group, p a prime, and k a field of characteristic p. We introduce the notion of an endotrivial chain complex of p-permutation kG-modules, which are the invertible objects in the bounded homotopy category of p-permutation kG-modules, and study the corresponding Picard group Ek(G) of endotrivial complexes. Such complexes are shown to induce splendid Rickard autoequivalences of kG. The elements of Ek(G) are determined uniquely by integral invariants arising from the Brauer construction and a degree one character G k×. Using ideas from Bouc's theory of biset functors, we provide a canonical decomposition of Ek(G), and as an application, give complete descriptions of Ek(G) for abelian groups and p-groups of normal p-rank 1. Taking Lefschetz invariants of endotrivial complexes induces a group homomorphism : Ek(G) O(T(kG)), where O(T(kG)) is the orthogonal unit group of the trivial source ring. Using recent results of Boltje and Carman, we give a Frobenius stability condition elements in the image of must satisfy.