A soliton hierarchy associated with a new spectral problem and its Hamiltonian structure

Solomon Manukure; Wen-Xiu Ma

doi:10.1063/1.4906903

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A soliton hierarchy associated with a new spectral problem and its Hamiltonian structure

Journal article

Peer reviewed

A soliton hierarchy associated with a new spectral problem and its Hamiltonian structure

Solomon Manukure and Wen-Xiu Ma

Journal of mathematical physics, Vol.56(2), p.1

01/02/2015

DOI: https://doi.org/10.1063/1.4906903

Abstract

Physical Sciences

Physics

Physics, Mathematical

Science & Technology

A hierarchy of soliton equations together with its Hamiltonian structure is constructed from a new spectral problem associated with the three-dimensional special orthogonal real Lie algebra, so(3,R). The Liouville integrability of the presented soliton hierarchy is proved, based on the Hamiltonian structure. (C) 2015 AIP Publishing LLC.

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Title: A soliton hierarchy associated with a new spectral problem and its Hamiltonian structure
Creators - without role: Solomon Manukure - University of South Florida
Wen-Xiu Ma - University of South Florida
Publication Details: Journal of mathematical physics, Vol.56(2), p.1
Publisher: Amer Inst Physics
Number of pages: 7
Grant note: 11371326; 11271008; 61072147 / NNSFC; National Natural Science Foundation of China (NSFC) DMS-1301675 / NSF; National Science Foundation (NSF) First-class Discipline of Universities in Shanghai A.13-0101-12-004 / Shanghai University Leading Academic Project T200905 / Zhejiang Innovation Project of China
Identifiers: 9934367008331
Academic Unit: King Abdulaziz University
Language: English
Resource Type: Journal article