English

Characteristic Classes and Integrable Systems. General Construction

Mathematical Physics 2010-12-07 v4 High Energy Physics - Theory math.MP Exactly Solvable and Integrable Systems

Abstract

We consider topologically non-trivial Higgs bundles over elliptic curves with marked points and construct corresponding integrable systems. In the case of one marked point we call them the modified Calogero-Moser systems (MCM systems). Their phase space has the same dimension as the phase space of the standard CM systems with spin, but less number of particles and greater number of spin variables. Topology of the holomorphic bundles are defined by their characteristic classes. Such bundles occur if G has a non-trivial center, i.e. classical simply-connected groups, E6E_6 and E7E_7. We define the conformal version CG of G - an analog of GL(N) for SL(N), and relate the characteristic classes with degrees of CG-bundles. Starting with these bundles we construct Lax operators, quadratic Hamiltonians, define the phase spaces and the Poisson structure using dynamical r-matrices. To describe the systems we use a special basis in the Lie algebras that generalizes the basis of t'Hooft matrices for sl(N). We find that the MCM systems contain the standard CM systems related to some (unbroken) subalgebras. The configuration space of the CM particles is the moduli space of the holomorphic bundles with non-trivial characteristic classes.

Keywords

Cite

@article{arxiv.1006.0702,
  title  = {Characteristic Classes and Integrable Systems. General Construction},
  author = {A. Levin and M. Olshanetsky and A. Smirnov and A. Zotov},
  journal= {arXiv preprint arXiv:1006.0702},
  year   = {2010}
}

Comments

52 pages, 8 tables

R2 v1 2026-06-21T15:31:41.628Z