Representations of quantum groups at roots of unity, Whittaker vectors and q-W algebras

Abstract

Let U( g) be the standard simply connected version of the Drinfeld-Jumbo quantum group at an odd primitive m-th root of unity . The center of U( g) contains a huge commutative subalgebra isomorphic to the algebra ZG of regular functions on (a finite covering of a big cell in) a complex connected, simply connected algebraic group G with Lie algebra g. Let V be a finite-dimensional representation of U( g) on which ZG acts according to a non-trivial character ηg given by evaluation of regular functions at g∈ G. Then V is a representation of the finite-dimensional algebra Uηg=U( g)/U( g) Ker~ηg. We show that in this case, under certain restrictions on m, Uηg contains a subalgebra Uηg( m-) of dimension m12 dim~O, where O is the conjugacy class of g, and Uηg( m-) has a one-dimensional representation C_g. We also prove that if V is not trivial then the space of Whittaker vectors HomUηg( m-)(C_g,V) is not trivial and the algebra Wηg= EndUηg(UηgUηg( m-)C_g) naturally acts on it which gives rise to a Schur-type duality between representations of the algebra Uηg and of the algebra Wηg called a q-W algebra.