Mirabolic quantum sl2

Abstract

The quantum enveloping algebra of sln (and the quantum Schur algebras) was constructed by Beilinson-Lusztig-MacPherson as the convolution algebra of GLd-invariant functions over the space of pairs of partial n-step flags over a finite field. In this paper we expand the construction to the mirabolic setting of triples of two partial flags and a vector, and examine the resulting convolution algebra. In the case of n=2, we classify the finite dimensional irreducible representations of the mirabolic quantum algebra and we prove that the category of such representations is semisimple. Finally, we describe a mirabolic version of the quantum Schur-Weyl duality, which involves the mirabolic Hecke algebra.