Quantized Quiver Varieties and the Quantum Spin Ruijsenaars-Schneider Model

Abstract

This paper tackles the long-standing problem of quantizing the rational spin Ruijsenaars--Schneider model originating in the work of Krichever and Zabrodin. We make use of the technique of quantum Hamiltonian reduction to construct a quantized quiver variety AN, associated to the framed Jordan quiver. This quantized quiver variety is simultaneously the algebra of quantum observables of the rational spin Ruijsenaars--Schneider model of N particles with spin polarizations. Inside this algebra, we find a loop algebra and Yangian of gl and conjecture that in the limit of infinitely many particles, the algebra AN, becomes a shifted affine Yangian. We also exhibit a difference equation for eigenstates of the lowest Hamiltonian that reduces to the spinless case when =1.