Quantum extremal loop weight modules and monomial crystals

Abstract

In this paper we construct a new family of representations for the quantum toroidal algebras of type An, which are -extremal in the sense of Hernandez [24]. We construct extremal loop weight modules associated to level 0 fundamental weights when n=2r+1 is odd and =1, r+1 or n. To do it, we relate monomial realizations of level 0 extremal fundamental weight crystals with integrable representations of Uq(sln+1tor), and we introduce promotion operators for the level 0 extremal fundamental weight crystals. By specializing the quantum parameter, we get finite-dimensional modules of quantum toroidal algebras at roots of unity. In general, we give a conjectural process to construct extremal loop weight modules from monomial realizations of crystals.