Hamiltonian Structure of Equations Appearing in Random Matrices
Abstract
The level spacing distributions in the Gaussian Unitary Ensemble, both in the ``bulk of the spectrum,'' given by the Fredholm determinant of the operator with the sine kernel π(x-y) π(x-y) and on the ``edge of the spectrum,'' given by the Airy kernel Ai(x) Ai'(y) - Ai(y) Ai'(x) (x-y), are determined by compatible systems of nonautonomous Hamiltonian equations. These may be viewed as special cases of isomonodromic deformation equations for first order 2× 2 matrix differential operators with regular singularities at finite points and irregular ones of Riemann index 1 or 2 at ∞. Their Hamiltonian structure is explained within the classical R-matrix framework as the equations induced by spectral invariants on the loop algebra sl(2), restricted to a Poisson subspace of its dual space sl*R(2), consisting of elements that are rational in the loop parameter.
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