Superalgebra deformations of web categories: finite webs

Abstract

Let k be a characteristic zero domain. For a locally unital k-superalgebra A with distinguished idempotents Iand even subalgebra a ⊂eq A 0, we define and study an associated diagrammatic monoidal k-linear supercategory WebA,aI. This supercategory yields a diagrammatic description of the generalized Schur algebras TAa(n,d). We also show there is an asymptotically faithful functor from WebA,aI to the monoidal supercategory of gln(A)-modules generated by symmetric powers of the natural module. When this functor is full, the single diagrammatic supercategory WebA,aI provides a combinatorial description of this module category for all n ≥ 1. We also use these results to establish Howe dualities between glm(A) and gln(A) when A is semisimple.