Integrable quadratic structures in peakon models
Abstract
We propose realizations of the Poisson structures for the Lax representations of three integrable -body peakon equations, Camassa--Holm, Degasperis--Procesi and Novikov. The Poisson structures derived from the integrability structures of the continuous equations yield quadratic forms for the -matrix representation, with the Toda molecule classical -matrix playing a prominent role. We look for a linear form for the -matrix representation. Aside from the Camassa--Holm case, where the structure is already known, the two other cases do not allow such a presentation, with the noticeable exception of the Novikov model at . Generalized Hamiltonians obtained from the canonical Sklyanin trace formula for quadratic structures are derived in the three cases.
Keywords
Cite
@article{arxiv.2203.13593,
title = {Integrable quadratic structures in peakon models},
author = {J. Avan and L. Frappat and E. Ragoucy},
journal= {arXiv preprint arXiv:2203.13593},
year = {2022}
}
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19 pages