Nonlinear Sciences – Exactly Solvable and Integrable Systems
Scientific paper
2006-06-14
Inverse Problems 22 (2006) 2001-2020
Nonlinear Sciences
Exactly Solvable and Integrable Systems
Further comments and references added
Scientific paper
10.1088/0266-5611/22/6/006
We consider an integrable scalar partial differential equation (PDE) that is second order in time. By rewriting it as a system and applying the Wahlquist-Estabrook prolongation algebra method, we obtain the zero curvature representation of the equation, which leads to a Lax representation in terms of an energy-dependent Schr\"{o}dinger spectral problem of the type studied by Antonowicz and Fordy. The solutions of this PDE system, and of its associated hierarchy of commuting flows, display weak Painlev\'e behaviour, i.e. they have algebraic branching. By considering the travelling wave solutions of the next flow in the hierarchy, we find an integrable perturbation of the case (ii) Henon-Heiles system which has the weak Painlev\'{e} property. We perform separation of variables for this generalized Henon-Heiles system, and describe the corresponding solutions of the PDE.
Hone Andrew N. W.
Novikov Sergey V.
Verhoeven Caroline
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