Quantum Groups and Quantum Cohomology

TL;DR

This paper explores the structure of quantum cohomology of Nakajima quiver varieties using Yangian algebras, providing explicit formulas, connections to integrable systems, and applications to moduli spaces and W-algebras.

Contribution

It constructs a Yangian action on quiver variety cohomology, linking quantum multiplication to algebraic structures and extending the theory to moduli spaces of sheaves with explicit realizations.

Findings

Yangian Y_Q acts on the cohomology of Nakajima quiver varieties.

Quantum multiplication by divisors is expressed via Yangian elements.

The quantum ring is generated by divisor operators and related to Baxter subalgebras.

Abstract

In this paper, we study the classical and quantum equivariant cohomology of Nakajima quiver varieties for a general quiver Q. Using a geometric R-matrix formalism, we construct a Hopf algebra Y_Q, the Yangian of Q, acting on the cohomology of these varieties, and show several results about their basic structure theory. We prove a formula for quantum multiplication by divisors in terms of this Yangian action. The quantum connection can be identified with the trigonometric Casimir connection for Y_Q; equivalently, the divisor operators correspond to certain elements of Baxter subalgebras of Y_Q. A key role is played by geometric shift operators which can be identified with the quantum KZ difference connection. In the second part, we give an extended example of the general theory for moduli spaces of sheaves on C^2, framed at infinity. Here, the Yangian action is analyzed explicitly in terms of a free field realization; the corresponding R-matrix is closely related to the reflection operator in Liouville field theory. We show that divisor operators generate the quantum ring, which is identified with the full Baxter subalgebras. As a corollary of our construction, we obtain an action of the W-algebra W(gl(r)) on the equivariant cohomology of rank $r$ moduli spaces, which implies certain conjectures of Alday, Gaiotto, and Tachikawa.