A Representation-Theoretic Approach to qq-Characters
Abstract
We raise the question of whether (a slightly generalized notion of) qq-characters can be constructed purely representation-theoretically. In the main example of the quantum toroidal gl1 algebra, geometric engineering of adjoint matter produces an explicit vertex operator RR which computes certain qq-characters, namely Hirzebruch y-genera, completely analogously to how the R-matrix R computes q-characters. We give a geometric proof of the independence of preferred direction for the refined vertex in this and more general non-toric settings.
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