Non-negligible summands in tensor powers of some modular representations of finite p-groups

Abstract

Let p>0 be a prime, G be a finite p-group and be an algebraically closed field of characteristic p. Dave Benson has conjectured that if p=2 and V is an odd-dimensional indecomposable representation of G then all summands of the tensor product V V* except for have even dimension. It is known that the analogous result for general p is false. In this paper, we investigate the class of graded representations V which have dimension coprime to p and for which V V* has a non-trivial summand of dimension coprime to p, for a graded group scheme closely related to Z/pr Z × Z/ps Z, where r and s are nonnegative integers and p>2. We produce an infinite family of such representations in characteristic 3 and show in particular that the tensor subcategory generated by any of these representations in the semisimplification contains the modulo 3 reduction of the category of representations of the symmetric group S3. Our results are compatible with a general version of Benson's conjecture due to Etingof.