Lattice soliton equation hierarchy and associated properties

• Published in: Chinese physics B Vol. 21; no. 9; pp. 37 - 42
• Main Author: 郑新卿 刘金元
• Format: Journal Article
• Language: English
• Published: 01.09.2012
• Subjects: Hierarchies; Lattices; Magnetic fluids; Mathematical analysis; Mathematical models; Nonlinear optics; Nonlinearity; Solitons; 孤立子理论; 层次结构; 晶格孤子方程; 格子; 物业; 等离子体物理; 非线性光学; 非线性现象
• ISSN: 1674-1056; 2058-3834; 1741-4199
• DOI: 10.1088/1674-1056/21/9/090202

As a new subject, soliton theory is shown to be an effective tool for describing and explaining nonlinear phenomena in nonlinear optics, super conductivity, plasma physics, magnetic fluid, etc. Thus, the study of soliton equations has always been one of the most prominent events in the field of nonlinear science during the past few years. Moreover, it is important to seek the lattice soliton equation and study its properties. In this study, firstly, we derive a discrete integrable system by using the Tu model. Then, some properties of the obtained equation hierarchies are discussed.