Polynomial functors on some categories of elements

Abstract

We study the category F(SS,V) of functors from the category SS, which is the category of elements of some presheaf S on the category Vf of finite dimensional vector spaces, to V the category of vector spaces of any dimension on some field k. In the case where S satisfies some noetherianity condition, we have a convenient description of the category SS. In this case, we can define a notion of polynomial functors on SS. And, like in the usual setting of functors from the category of finite dimensional vector spaces to the one of vector spaces of any dimension, we can describe the quotient Poln(SS,V)/Poln-1(SS,V), where Poln(SS,V) denote the full subcategory of F(SS,V) of polynomial functors of degree less than or equal to n. Finally, if k=Fp for some prime p and if S satisfies the required noetherianity condition, we can compute the set of isomorphism classes of simple objects in F(SS,V).