Calogero-Moser system

노트

Calogero–Moser system with elliptic potentials are studied.^[1]
The goal of the present lecture notes is to give an introduction to the theory of Calogero–Moser systems, highlighting their interplay with these fields.^[2]
The proposed project lies in the areas of integrable systems, and more specifically Calogero-Moser systems, Cherednik algebras and the theory of Frobenius manifolds.^[3]
This will also give a unified approach to the integrability of generalised Calogero-Moser systems.^[3]
We also present two important classes of new examples, a family of hyperbolic spin Calogero-Moser systems and the spin Toda lattices.^[4]
If G is a real reflection group, these families reduce to the known generalizations of elliptic Calogero–Moser systems, but in the non-real case they appear to be new.^[5]

The proposed project lies in the areas of integrable systems, and more specifically Calogero-Moser systems, Cherednik algebras and the theory of Frobenius manifolds.^[1]
This will also give a unified approach to the integrability of generalised Calogero-Moser systems.^[1]
Lie algebra coupled to the Calogero-Moser system of n interacting particles on the real line.^[2]
Calogero-Moser systems are classical and quantum integrable multiparticle dynamics defined for any root system Delta.^[3]
The associated integrable models (called integrable spin Calogero-Moser systems in the paper) and their Lax pairs are then obtained via Poisson reduction and gauge transformations.^[4]