Affine and cyclotomic q-Schur categories via webs

Abstract

We formulate two new Z[q,q-1]-linear diagrammatic monoidal categories, the affine q-web category and the affine q-Schur category, as well as their respective cyclotomic quotient categories. Diagrammatic integral bases for the Hom-spaces of all these categories are established. In addition, we establish the following isomorphisms, providing diagrammatic presentations of these q-Schur algebras for the first time: (i)~ the path algebras of the affine q-web category to R.~Green's affine q-Schur algebras, (ii)~ the path algebras of the affine q-Schur category to Maksimau-Stroppel's higher level affine q-Schur algebras, and most significantly, (iii)~ the path algebras of the cyclotomic q-Schur categories to Dipper-James-Mathas' cyclotomic q-Schur algebras.

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