Multiple chordal SLE() and quantum Calogero-Moser system

Abstract

We study multiple chordal SLE() systems in a simply connected domain , where z1, …, zn ∈ ∂ are boundary starting points and q ∈ ∂ is an additional marked boundary point. As a consequence of the domain Markov property and conformal invariance, we show that the presence of the marked boundary point q gives rise to a natural equivalence relation on partition functions. While these functions are not necessarily conformally covariant, each equivalence class contains a conformally covariant representative. Building on the framework introduced in Dub07, we demonstrate that in the H-uniformization with q = ∞, the partition functions satisfy both the null vector equations and a dilatation equation with scaling exponent d. Using techniques from the Coulomb gas formalism in conformal field theory, we construct two distinct families of solutions, each indexed by a topological link pattern of type (n, m) with 2m ≤ n. In the special case = H and q = ∞, we further show that these partition functions correspond to eigenstates of the quantum Calogero-Moser system, thereby extending the known correspondence beyond the standard (2n, n) setting.