The q-Schur algebras and q-Schur dualities of finite type

Abstract

We formulate a q-Schur algebra associated to an arbitrary W-invariant finite set X f of integral weights for a complex simple Lie algebra with Weyl group W. We establish a q-Schur duality between the q-Schur algebra and Hecke algebra associated to W. We then realize geometrically the q-Schur algebra and duality, and construct a canonical basis for the q-Schur algebra with positivity. With suitable choices of X f in classical types, we recover the q-Schur algebras in the literature. Our q-Schur algebras are closely related to the category O, where the type G2 is studied in detail.