R--Matrix Construction of Electromagnetic Models for the Painlev\'e Transcendents
Abstract
The Painlev\'e transcendents PI--PV and their representations as isomonodromic deformation equations are derived as nonautonomous Hamiltonian systems from the classical R--matrix Poisson bracket structure on the dual space slR*(2) of the loop algebra slR(2). The Hamiltonians are obtained by composing elements of the Poisson commuting ring of spectral invariant functions on slR*(2) with a time--dependent family of Poisson maps whose images are 4--dimensional rational coadjoint orbits in slR*(2). Each system may be interpreted as describing a particle moving on a surface of zero curvature in the presence of a time--varying electromagnetic field. The Painlev\'e equations follow from reduction of these systems by the Hamiltonian flow generated by a second commuting element in the ring of spectral invariants.
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