Deligne-Knop tensor categories and functoriality

Abstract

A general construction of Knop creates a symmetric monoidal category T(A,δ) from any regular category A and a fixed degree function δ. A special case of this construction are the Deligne categories Rep(St) and Rep(GLt(Fq)). We discuss when a functor F:A A' between regular categories induces a symmetric monoidal functor T(A,δ) T(A',δ'). We then give a criterion when a pair of adjoint functors between two regular categories A, \ A' lifts to a pair of adjoint functors between T(A,δ) and T(A',δ').

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