Elliptic Quantum Toroidal Algebra Ut1,t2,p(glN,tor) and Elliptic Stable Envelopes for the A(1)N-1 Quiver Varieties
Abstract
We propose a new construction of vertex operators of the elliptic quantum toroidal algebra Ut1,t2,p(glN,tor) by combining representations of the algebra and formulas of the elliptic stable envelopes for the A(1)N-1 quiver variety M(v,w). Compositions of the vertex operators turn out consistent to the shuffle product formula of the elliptic stable envelopes. Their highest to highest expectation values provide K-theoretic vertex functions for M(v,w). We also derive exchange relation of the vertex operators and construct a L-operator satisfying the RLL=LLR* relation with R and R* being elliptic dynamical R-matrices defined as transition matrices of the elliptic stable envelopes. Assuming a universal form of L and defining a comultiplication in terms of it, we show that our vertex operators are intertwining operators of the Ut1,t2,p(glN,tor)-modules w.r.t .
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