Isospectral flow in Loop Algebras and Quasiperiodic Solutions of the Sine-Gordon Equation
Abstract
The sine-Gordon equation is considered in the hamiltonian framework provided by the Adler-Kostant-Symes theorem. The phase space, a finite dimensional coadjoint orbit in the dual space * of a loop algebra , is parametrized by a finite dimensional symplectic vector space W embedded into * by a moment map. Real quasiperiodic solutions are computed in terms of theta functions using a Liouville generating function which generates a canonical transformation to linear coordinates on the Jacobi variety of a suitable hyperelliptic curve.
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