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» » Global Classical Solutions for Nonlinear Evolution Equations (Monographs and Surveys in Pure and Applied Mathematics)
Global Classical Solutions for Nonlinear Evolution Equations (Monographs and Surveys in Pure and Applied Mathematics) e-book

Author:

T Li,Yun-Mei Chen

Language:

English

Category:

Math

Subcategory:

Mathematics

ePub size:

1903 kb

Other formats:

azw rtf docx lrf

Rating:

4.2

Publisher:

Chapman and Hall/CRC; 1 edition (April 21, 1992)

Pages:

240

ISBN:

0582055881

Global Classical Solutions for Nonlinear Evolution Equations (Monographs and Surveys in Pure and Applied Mathematics) e-book

by T Li,Yun-Mei Chen


The book also addresses classical Faber–Krahn inequalities for elliptic and time-periodic problems and extends .

The book also addresses classical Faber–Krahn inequalities for elliptic and time-periodic problems and extends the linear theory for scalar nonautonomous and random parabolic equations to cooperative systems. The final chapter presents applications to Kolmogorov systems of parabolic equations. By thoroughly explaining the spectral theory for nonautonomous and random linear parabolic equations, this resource reveals the importance of the theory in examining nonlinear problems. Скачать (pdf, . 5 Mb) Читать. Epub FB2 mobi txt RTF.

Hardback – 2003-05-28 CRC Press Monographs and Surveys in Pure and Applied .

Hardback – 2003-05-28 CRC Press Monographs and Surveys in Pure and Applied Mathematics. Hyperbolic Conservation Laws and the Compensated Compactness Method. The propagation of curved, nonlinear wavefronts and shock fronts are very complex phenomena. With the recent finding that almost all classical linear partial differential equations of mathematical physics can be set in the context of Clifford analysis-and that they can be obtained without applying an. ardback – 1999-01-06 Chapman and Hall/CRC Monographs and Surveys in Pure and Applied Mathematics.

The evolution of structures of special discontinuities representing solutions of the Cauchy problem for a generalized . The main purpose of this work is to investigate the feasibility of applying a kinetic approach to the problem of modeling turbulent and unstable flows.

The evolution of structures of special discontinuities representing solutions of the Cauchy problem for a generalized Korteweg-de Vries-Burgers equation is numerically investigated with allowance for complex nonlinearity, dispersion, and dissipation. Various perturbations of these solutions are considered, and a decay scenario for a solution representing a special discontinuity structure is analyzed.

Li, T. T. and Chen, Y. Global Classical Solutions for Nonlinear Evolution Equations, Pitman Monographs and Surveys in Pure and Applied Mathematics, Vol. 45, Longman Scientific Technical, New York. 45, Longman Scientific Technical, New York, 1992. zbMATHGoogle Scholar. Li, T. and Yu, . Durée die vie des solutions régulières pour leséquations des ondes non linéaires, C. R. Acad. Masuda, . Blow-up of solutions for quasi-linear wave equations in two space dimensions, Lect. Sideris, T. Nonexistence of global solutions to semilinear wave equations in high dimensions, J. Diff.

S. Carl, Seppo Heikkila October 23, 2019. This important new book sets forth a comprehensive description of various mathematical aspects of problems originating in numerical solution of hyperbolic systems of partial differential equations. Interfacial Phenomena and Convection. Satya Mukhopadhyay September 05, 2019.

Li and . hen, Global Classical Solutions for Nonlinear Evolution Equations, Pit-man Monographs and Surveys in Pure and Applied Mathematics45, Longman Scientic & Technical, (1992). i and . hen, Nonlinear Evolution Equations Science Press, Beijing, China, (1990).

Start by marking Global Classical Solutions for Nonlinear Evolution Equations as Want to Read .

Start by marking Global Classical Solutions for Nonlinear Evolution Equations as Want to Read: Want to Read savin. ant to Read. Details (if other): Cancel. Thanks for telling us about the problem.

This book presents some spectral theory methods for the investigation of soliton equations ad the inverse .

This book presents some spectral theory methods for the investigation of soliton equations ad the inverse scattering problems related to these equations. The authors give the theory of expansions for the Sturm-Liouville operator and the Dirac operator. 1. Spectral Methods in Soliton Equations. Published by Chapman and Hall/CRC (1994).

T. Li and Y. M. Chen, Nonlinear Evolution Equations, Scientific Press, 1989 (Chinese). S. Zheng, Nonlinear Evolution Equations, vol. 133 of Monographs and Surveys in Pure and Applied Mathematics, Chapman & Hall/CRC, 2004.

The book is a self-contained one and there are complete proofs for all the results. In our opinion, it is a highly recommended introductory book in Homological Algebra for everyone interested in this subject. Zentralblatt MATH, 1045" he author on the one hand has included the underlying basics, model and category theory, which are developed from scratch. On the other hand the elementary notions and results of homological algebra are treated in great detail and often their importance within that theory as well as in applications is shown. All in all the author has managed.

This monograph is devoted to the global existence and the lifespan of classical solutions to the Cauchy problem with small initial data for nonlinear heat equations, nonlinear wave equations and nonlinear Schrodinger equations. The topic has been investigated using a variety of methods by many mathematicians such as L. Hormander, F. John, and S. Klainerman. In this book the authors present a simple and direct method by which to obtain in a unified manner all recent results in the field, including those obtained by themselves and their collaborators. The same method can also be used to treat similar problems for various kinds of nonlinear evolution equations.The volume is self-contained, but assumes knowledge of the basic theory of Sobolev spaces and linear evolution equations.The work will be of interest to researchers and graduate students in pure and applied mathematics, mathematical physics and applied sciences.

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