Diagonal p-permutation functors in characteristic p

Abstract

Let p be a prime number. We consider diagonal p-permutation functors over a (commutative, unital) ring R in which all prime numbers different from p are invertible. We first determine the finite groups G for which the associated essential algebra ER(G) is non zero: These are groups of the form G=L u, where (L,u) is a D-pair. When R is an algebraically closed field F of characteristic 0 or p, this yields a parametrization of the simple diagonal p-permutation functors over F by triples (L,u,W), where (L,u) is a D-pair, and W is a simple FOut(L,u)-module. Finally, we describe the evaluations of the simple functor SL,u,W parametrized by the triple (L,u,W). We show in particular that if G is a finite group and F has characteristic p, the dimension of SL,1,F(G) is equal to the number of conjugacy classes of p-regular elements of G with defect isomorphic to L.

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