The representation theory of Brauer categories II: curried algebra

Abstract

A representation of gl(V)=V V* is a linear map μ gl(V) M M satisfying a certain identity. By currying, giving a linear map μ is equivalent to giving a linear map a V M V M, and one can translate the condition for μ to be a representation to a condition on a. This alternate formulation does not use the dual of V, and makes sense for any object V in a tensor category C. We call such objects representations of the curried general linear algebra on V. The currying process can be carried out for many algebras built out of a vector space and its dual, and we examine several cases in detail. We show that many well-known combinatorial categories are equivalent to the curried forms of familiar Lie algebras in the tensor category of linear species; for example, the titular Brauer category "is" the curried form of the symplectic Lie algebra. This perspective puts these categories in a new light, has some technical applications, and suggests new directions to explore.

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