Nonlinear evolution equations are widely used to describe nonlinear phenomena in natural and social sciences. However, they are usually quite difficult to solve in most instances. This book introduces the finite difference methods for solving nonlinear evolution equations. The main numerical analysis tool is the energy method. This book covers the difference methods for the initial-boundary value problems of twelve nonlinear partial differential equations. They are Fisher equation, Burgers’ equation, regularized long-wave equation, Korteweg-de Vries equation, Camassa-Holm equation, Schrödinger equation, Kuramoto-Tsuzuki equation, Zakharov equation, Ginzburg-Landau equation, Cahn-Hilliard equation, epitaxial growth model and phase field crystal model. This book is a monograph for the graduate students and science researchers majoring in computational mathematics and applied mathematics. It will be also useful to all researchers in related disciplines.
Zhi-Zhong Sun & Qifeng Zhang
Finite Difference Methods for Nonlinear Evolution Equations
Finite Difference Methods for Nonlinear Evolution Equations
Limba Engleză ● Format EPUB ● Pagini 432 ● ISBN 9783110796117 ● Mărime fișier 67.2 MB ● Editura De Gruyter ● Oraș Berlin/Boston ● Publicat 2023 ● Ediție 1 ● Descărcabil 24 luni ● Valută EUR ● ID 8879169 ● Protecție împotriva copiilor Adobe DRM
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