Topology of the real part of hyperelliptic Jacobian associated with the periodic Toda lattice

Abstract

This paper concerns the topology of the isospectral real manifold of the sl(N) periodic Toda lattice consisting of 2N-1 different systems. The solutions of those systems contain blow-ups, and the set of those singular points defines a devisor of the manifold. Then adding the divisor, the manifold is compactified as the real part of the (N-1)-dimensional Jacobi variety associated with a hyperelliptic Riemann surface of genus g=N-1. We also study the real structure of the divisor, and then provide conjectures on the topology of the affine part of the real Jacobian and on the gluing rule over the divisor to compactify the manifold based upon the sign-representation of the Weyl group of sl(N).

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