Global well-posedness of the Toda lattice on an exact spectral phase space
Abstract
We identify an exact spectral phase space for the two-sided Toda lattice. Let q=\an,bn\n∈ Z be coefficients of the right and left half-line Jacobi operators and denote their spectral measures by σq. Define a phase space \[ Q=\ array [c]c% q=\an,bn\n∈ Z: an>0,\ bn ∈ R and ∫ Rec|λ|σq(dλ)<∞ for every c>0 array \ . \] The integrability condition makes the representing measures unique. We prove that q∈ Q if and only if the Toda lattice with initial datum q admits a classical solution for all positive and negative times. Moreover, the solution remains in Q, is unique, and depends continuously on the initial datum, uniformly on compact time intervals.
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