Bounded complexes of permutation modules

Abstract

Let k be a field of characteristic p > 0. For G an elementary abelian p-group, there exist collections of permutation module such that if C* is any exact bounded complex whose terms are sums of copies of modules from the collection, then C* is contractible. A consequence is that if G is any finite group whose Sylow p-subgroups are not cyclic or quaternion, and if C* is a bounded exact complex such that each Ci is direct sum of one dimensional modules and projective modules, then C* is contractible.