Nilpotent Category of Abelian Category and Self-Adjoint Functors

Abstract

Let C be an additive category. The nilpotent category Nil (C) of C, consists of objects pairs (X, x) with X∈C, x∈EndC(X) such that xn=0 for some positive integer n, and a morphism f:(X, x)→ (Y,y) is f∈ HomC(X, Y) satisfying fx=yf. A general theory of Nil(C) is established and it is abelian in the case that C is abelian. Two abelian categories are equivalent if and only if their nilpotent categories are equivalent, which generalizes a Song, Wu, and Zhang's result. As an application, it is proved all self-adjoint functors are naturally isomorphic to Hom and Tensor functors over the category Nil of finite-dimensional vector spaces. Both Hom and Tensor can be naturally generalized to HOM and Tensor functor over Nil(V). They are still self-adjoint, but intrinsically different.