From Toda to KdV

Abstract

For periodic Toda chains with a large number N of particles we consider states which are N-2-close to the equilibrium and constructed by discretizing arbitrary given C2-functions with mesh size N-1. Our aim is to describe the spectrum of the Jacobi matrices L\N appearing in the Lax pair formulation of the dynamics of these states as N ∞. To this end we construct two Hill operators H\ -- such operators come up in the Lax pair formulation of the Korteweg-de Vries equation -- and prove by methods of semiclassical analysis that the asymptotics as N → ∞ of the eigenvalues at the edges of the spectrum of L\N are of the form (2-(2N)-2 λ \n + ·s ) where (λ \n)\n ≥ 0 are the eigenvalues of H\ . In the bulk of the spectrum, the eigenvalues are o(N-2)-close to the ones of the equilibrium matrix. As an application we obtain asymptotics of a similar type of the discriminant, associated to L\N.