Extended affine Lie algebras, vertex algebras, and reductive groups

Abstract

In this paper, we explore natural connections among the representations of the extended affine Lie algebra slN(Cq) with Cq=Cq[t01,t11] an irrational quantum 2-torus, the simple affine vertex algebra Lsl∞(,0) with a positive integer, and Levi subgroups G of GL(C). First, we give a canonical isomorphism between the category of integrable restricted slN(Cq)-modules of level and that of equivariant quasi Lsl∞(,0)-modules. Second, we classify irreducible N-graded equivariant quasi Lsl∞(,0)-modules. Third, we establish a duality between irreducible N-graded equivariant quasi Lsl∞(,0)-modules and irreducible regular G-modules on certain fermionic Fock spaces. Fourth, we obtain an explicit realization of every irreducible N-graded equivariant quasi Lsl∞(,0)-module. Fifth, we completely determine the following branchings: 1 The branching from Lsl∞(,0) Lsl∞(',0) to Lsl∞(+',0) for quasi modules. 2 The branching from slN(Cq) to its Levi subalgebras. 3 The branching from slN(Cq) to its subalgebras slN(Cq[t0 M0,t1 M1]).