Elliptic Quantum Toroidal Algebras, Z-algebra Structure and Representations
Abstract
We introduce a new elliptic quantum toroidal algebra Uq,,p(gtor) associated with an arbitrary toroidal algebra gtor. We show that Uq,,p(gtor) contains two elliptic quantum algebras associated with a corresponding affine Lie algebra bg as subalgebras. They are analogue of the horizontal and the vertical subalgebras in the quantum toroidal algebra Uq,(gtor). A Hopf algebroid structure is introduced as a co-algebra structure of Uq,,p(gtor) using the Drinfeld comultiplication. We also investigate the Z-algebra structure of Uq,,p(gtor) and show that the Z-algebra governs the irreducibility of the level (k(=0),l)-infinite dimensional Uq,,p(gtor)-modules in the same way as in the elliptic quantum group Uq,p(g). As an example, we construct the level (1,l) irreducible representation of Uq,,p(gtor) for the simply laced gtor. We also construct the level (0,1) representation of Uq,,p(gN,tor) and discuss a conjecture on its geometric interpretation as an action on the torus equivariant elliptic cohomology of the affine AN-1 quiver variety.
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