Title :
The Jacobin elliptic function expansion method for solitonic solutions to nonlinear partial differential equations with symbolic computation
Author :
Xiqiang Zhao ; Weijun Sun
Author_Institution :
Coll. of Math. Sci., Ocean Univ. of China, Qingdao, China
Abstract :
In this paper, based on the computerized symbolic computation, the Jacobin elliptic function expansion method is improved for the solitonic solutions to nonlinear partial differential equations. A coupled KdV system of equations is chosen to illustrate the method, in which a simple transformation is used to simplify calculating process, and many new exact travelling wave solutions are obtained, especially the solutions involving fourth fourth power of Jacobin elliptic functions.
Keywords :
Korteweg-de Vries equation; elliptic equations; nonlinear differential equations; nonlinear functions; partial differential equations; solitons; symbol manipulation; Jacobin elliptic function expansion method; computerized symbolic computation; coupled KdV system; nonlinear partial differential equation; solitonic solution; travelling wave solution; Educational institutions; Jacobian matrices; Mathematical model; Nonlinear equations; Partial differential equations; Physics; Jacobin elliptic function; solitonic solution; symbolic computation;
Conference_Titel :
Natural Computation (ICNC), 2011 Seventh International Conference on
Conference_Location :
Shanghai
Print_ISBN :
978-1-4244-9950-2
DOI :
10.1109/ICNC.2011.6022521
