Garnier integrable system
In mathematical physics, the Garnier integrable system, also known as the classical Gaudin model is a classical mechanical system discovered by René Garnier in 1917, and solved using abelian integrals on compact Riemann surfaces of arbitrarily high genus. It is obtained by taking the 'Painlevé simplification' or 'autonomous limit' of the Schlesinger equations.
It may be interpreted as the classical limit of the quantum Gaudin model due to Michel Gaudin.
The Garnier systems were later shown to be of Hamiltonian type
, defined on a phase space consisting of the Cartesian product of copies of the dual of the Lie algebra, for a positive integer, and completely integrable in the Hamiltonian sense.
They are also a specific case of Hitchin integrable systems, when the algebraic curve that the theory is defined on is the Riemann sphere and the system is tamely ramified.
As a limit of the Schlesinger equations
The Schlesinger equations are a system of differential equations for matrix-valued functions, given byThe 'autonomous limit' is given by replacing the dependence in the denominator by constants with :
This is the Garnier system in the form originally derived by Garnier.
As the classical Gaudin model
There is a formulation of the Garnier system as a classical mechanical system, the classical Gaudin model, which quantizes to the quantum Gaudin model and whose equations of motion are equivalent to the Garnier system. This section describes this formulation.As for any classical system, the Gaudin model is specified by a Poisson manifold referred to as the phase space, and a smooth function on the manifold called the Hamiltonian.
Phase space
Let be a quadratic Lie algebra, that is, a Lie algebra with a non-degenerate invariant bilinear form. If is complex and simple, this can be taken to be the Killing form.The dual, denoted, can be made into a linear Poisson structure by the Kirillov–Kostant bracket.
The phase space of the classical Gaudin model is then the Cartesian product of copies of for a positive integer.
Sites
Associated to each of these copies is a point in, denoted, and referred to as sites.Lax matrix
Fixing a basis of the Lie algebra with structure constants, there are functions with on the phase space satisfying the Poisson bracketThese in turn are used to define -valued functions
with implicit summation.
Next, these are used to define the Lax matrix which is also a valued function on the phase space which in addition depends meromorphically on a spectral parameter,
and is a constant element in, in the sense that it Poisson commutes with all functions.
(Quadratic) Hamiltonian
The Hamiltonian iswhich is indeed a function on the phase space, which is additionally dependent on a spectral parameter. This can be written as
with
and
From the Poisson bracket relation
by varying and it must be true that the 's, the 's and are all in involution. It can be shown that the 's and Poisson commute with all functions on the phase space, but the 's do not in general. These are the conserved charges in involution for the purposes of Arnol'd Liouville integrability.
Lax equation
One can showso the Lax matrix satisfies the Lax equation when time evolution is given by any of the Hamiltonians, as well as any linear combination of them.