Analytical Traces on Coulomb Branches of Quiver Gauge Theories
Abstract
In this paper, we present an explicit construction of twisted traces for quantum Coulomb branches of conical theories. We develop an operator representation of the Coulomb branch algebra and use it to derive integral formulas for the twisted trace. Our construction provides a concrete realization of twisted traces that arise as the correlation functions of a conformal field theory, particularly in the work of Beem, Peelaers, and Rastelli. This complements recent developments in the study of twisted traces on quantum Higgs branches and offers new mathematical insights into the structure of quantum Coulomb branches.
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