On the ideals and essential algebras of shifted functors of linear representations

Abstract

We present a study on the Yoneda-Dress construction of biset functors of linear representations over a field of characteristic zero. We give a characterization of their lattices of ideals and we provide a criterion of vanishing for their essential algebras. We provide a parametrization for a family of simple modules over the functor of rational representations. Finally, we give an equivalence between the category of modules over the shifted functor of complex class functions and the category of modules over a semisimple algebra.