Non-additive exact functors and tensor induction for Mackey functors

First I will introduce a generalization of the notion of (right)-exact functor between abelian categories to the case of non-additive functors. The main result of this selection is an extension theorem: any functor defined on a suitable subcategory can be extended uniquely to a right exact functor defined on the whole category. Next I use those results to define various functors of generalized tensor induction, associated to finite bisets, between categories attached to finite groups. This includes a definition of tensor induction for Mackey functors, for cohomological Mackey functors, for $p$-permutation modules and algebras. This also gives a single formalism of bisets for restriction, inflation, and ordinary tensor induction for modules.

Introduction Non additive exact functors Permutation Mackey functors Tensor induction for Mackey functors Relations with the functors ${\mathcal L}_U$ Direct product of Mackey functors Tensor induction for Green functors Cohomological tensor induction Tensor induction for $p$-permutation modules Tensor induction for modules Bibliography.