Boris Dubrovin, Marta Mazzocco
Published 2003-11-16, updated 2007-01-10Version 4
The Schlesinger equations $S_{(n,m)}$ describe monodromy preserving deformations of order $m$ Fuchsian systems with $n+1$ poles. They can be considered as a family of commuting time-dependent Hamiltonian systems on the direct product of $n$ copies of $m\times m$ matrix algebras equipped with the standard linear Poisson bracket. In this paper we present a new canonical Hamiltonian formulation of the general Schlesinger equations $S_{(n,m)}$ for all $n$, $m$ and we compute the action of the symmetries of the Schlesinger equations in these coordinates.
Comments: 92 pages, no figures. Theorem 1.2 corrected, other misprints removed. To appear on Comm. Math. Phys
On the Reductions and Classical Solutions of the Schlesinger equations
On certain symmetries of $\mathbb R^3$ with a diagonal metric
Entropy Bounds for Self-shrinkers with Symmetries
![QR code for arXiv:math/0311261 [math.DG]](http://oss.arxitics.com/images/favicon.svg)