Elliptic Quantum Toroidal Algebra Uq,t,p(gl1,tor) and Affine Quiver Gauge Theories

Abstract

We introduce a new elliptic quantum toroidal algebra Uq,t,p(gl1,tor). Various representations in the quantum toroidal algebra Uq,t(gl1,tor) are extended to the elliptic case including the level (0,0) representation realized by using the elliptic Ruijsenaars difference operator. Intertwining operators of Uq,t,p(gl1,tor)-modules w.r.t. the Drinfeld comultiplication are also constructed. We show that Uq,t,p(gl1,tor) gives a realization of the affine quiver W-algebra Wq,t((A0)) proposed by Kimura-Pestun. This realization turns out to be useful to derive the Nekrasov instanton partition functions, i.e. the y- and elliptic genus, of the 5d and 6d lifts of the 4d N=2* theories and provide a new Alday-Gaiotto-Tachikawa correspondence.

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