Multiple chordal SLE(0) and classical Calogero-Moser system

Abstract

We develop a general theory of multiple chordal SLE(0) systems of type (n, m) for positive integers n and m with m ≤ n/2 , extending the construction of~ABKM20 beyond the previously studied case n = 2m. By applying integrals of motion associated with the Loewner evolution, we show that, in the H-uniformization with the marked point q = ∞, the traces of type (n, m) multiple chordal SLE(0) systems correspond to the real locus of real rational functions with n real simple critical points, m simple poles, and a pole of order n - 2m + 1 at infinity. Furthermore, we demonstrate that, under a common capacity parametrization, the Loewner dynamics evolve according to the classical Calogero-Moser Hamiltonian.