A Finite-Dimensional Integrable System Related to the Kadometsev–Petviashvili Equation

Author:

Liu Wei1,Liu Yafeng1,Wei Junxuan1,Yuan Shujuan2

Affiliation:

1. Department of Mathematics and Physics, Shijiazhuang Tiedao University, Shijiazhuang 050043, China

2. College of Science, North China University of Science and Technology, Tangshan 063210, China

Abstract

In this paper, the Kadometsev–Petviashvili equation and the Bargmann system are obtained from a second-order operator spectral problem Lφ=(∂2−v∂−λu)φ=λφx. By means of the Euler–Lagrange equations, a suitable Jacobi–Ostrogradsky coordinate system is established. Using Cao’s method and the associated Bargmann constraint, the Lax pairs of the differential equations are nonlinearized. Then, a new kind of finite-dimensional Hamilton system is generated. Moreover, involutive representations of the solutions of the Kadometsev–Petviashvili equation are derived.

Funder

National Natural Science Foundation of China

Publisher

MDPI AG

Subject

General Mathematics,Engineering (miscellaneous),Computer Science (miscellaneous)

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