Spectral Description of the Spin Ruijsenaars-Schneider System

Abstract

Fix a Weierstrass cubic curve E, and an element σ in the Jacobian variety Jac\, E corresponding to the line bundle Lσ. We introduce a space RSσ, n(E, V) of pure 1-dimensional sheaves living in Sσ = P( O Lσ) together with framing data at the 0 and ∞ sections E0, E∞ ⊂ Sσ . For a particular choice of V, we show that the space RSσ, n(E, V) is isomorphic to a completed phase space for the spin Ruijsenaars-Schneider system, with the Hamiltonian vector fields given by tweaking flows on sheaves at their restrictions to E0 and E∞. We compare this description of the RS system to the description of the Calogero-Moser system in arXiv:math/0603722, and show that the two systems can be assembled into a universal system by introducing a σ → 0 limit to the CM phase space. We also shed some light on the effect of Ruijsenaars' duality between trigonometric CM and rational RS spectral curves coming from the two descriptions in terms of supports of spectral sheaves.