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Elliptic Schlesinger system and Painlev{\'e} VI

Authors
  • Chernyakov, Yu.
  • Levin, A. M.
  • Olshanetsky, M.
  • Zotov, A.
Type
Preprint
Publication Date
Feb 20, 2006
Submission Date
Feb 20, 2006
Identifiers
DOI: 10.1088/0305-4470/39/39/S05
arXiv ID: nlin/0602043
Source
arXiv
License
Unknown
External links

Abstract

We construct an elliptic generalization of the Schlesinger system (ESS) with positions of marked points on an elliptic curve and its modular parameter as independent variables (the parameters in the moduli space of the complex structure). ESS is a non-autonomous Hamiltonian system with pair-wise commuting Hamiltonians. The system is bihamiltonian with respect to the linear and the quadratic Poisson brackets. The latter are the multi-color generalization of the Sklyanin-Feigin-Odeskii classical algebras. We give the Lax form of the ESS. The Lax matrix defines a connection of a flat bundle of degree one over the elliptic curve with first order poles at the marked points. The ESS is the monodromy independence condition on the complex structure for the linear systems related to the flat bundle. The case of four points for a special initial data is reduced to the Painlev{\'e} VI equation in the form of the Zhukovsky-Volterra gyrostat, proposed in our previous paper.

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