Coifman, "Inverse scattering and evolution equations," Comm. Pure & Applied Math., 38 (1985), 29-42.Beals R., Coifman R. R., Inverse scattering and evolution equations, Comm. Pure Appl. Math., :Beals R,Coifman R
Math. (1983) M.J. Ablowitz et al. Comments on the Inverse Scattering Transform and Related Nonlinear Evolution EquationsA.S. Fokas et al. The Inverse Scattering Transform for Multidimensional (2 + 1) Problems There are more references available in the full text version of this article....
SOLITONS, NONLINEAR EVOLUTION EQUATIONS AND INVERSE SCATTERING (London Mathematical Society Lecture Note Series 149)doi:10.1112/blms/25.6.620Drazin, P. GOxford University PressBulletin of the London Mathematical Society
Solitons Nonlinear Evolution Equations and Inverse Scattering (London Mathematical Society Lecture Note Series) (M. A. Ablowitz P. A. Clarkson) 0521387302 热度: 相关推荐 SOLITONS NONLINEAR EVOLUTION EQUATIONS AND INVERSE SCATTERING(ABLOWITZ),SOLITONS NONLINEAR EVOLUTION EQUATIONS AND INVERSE SCATTERING(AB...
Emphasis is given to the multi-dimensional problems arising and includes inverse scattering in multi-dimensions, integrable nonlinear evolution equations in multi-dime... (展开全部) 丛书信息 ··· London Mathematical Society Lecture Note Series(共143册),这套丛书还有 《Algebraic Topology via Different...
Solitons, Nonlinear Evolution Equations and Inverse Scattering 2025 pdf epub mobi 电子书 图书描述 Solitons have been of considerable interest to mathematicians since their discovery by Kruskal and Zabusky. This book brings together several aspects of soliton theory currently only available in research pap...
Only certain nonlinear wave equations can be solved with the inverse scattering method [39]. The NLS equation (5.1.1) belongs to this special class of equations. Zakharov and Shabat used the inverse scattering method in 1971 to solve the NLS equation [46]. This method is similar in spirit ...
Ablowitz, M.J. (1980). Solitons, solutions of nonlinear evolution equations, and the inverse scattering transform. In: DeSanto, J.A., Sáenz, A.W., Zachary, W.W. (eds) Mathematical Methods and Applications of Scattering Theory. Lecture Notes in Physics, vol 130. Springer, Berlin, Heidelbe...
The term soliton was introduced by Zabusky and Kruskal in 1965 to denote a solitary wave pulse with a particle‐like behavior in the solution to the Korteweg-de Vries (KdV) equation. Time evolution of the scattering data: The evolvement of the scattering data from its initial value \( { ...
of the one-dimensional Schrödinger equation with turning point on the half-line(0,∞). The scattering data of the problem is defined and the fundamental equation is derived. With the help of the derived fundamental equation, in terms of the scattering data, the potential is recovered ...