A Stability Technique for Evolution Partial Differential Equations: A Dynamical Systems Approach

Overview

* Introduces a state-of-the-art method for the study of the asymptotic behavior of solutions to evolution partial differential equations.

* Written by established mathematicians at the forefront of their field, this blend of delicate analysis and broad application is ideal for a course or seminar in asymptotic analysis and nonlinear PDEs.

* Well-organized text with detailed index and bibliography, suitable as a course text or reference volume.

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Paperback (Softcover reprint of the original 1st ed. 2004)
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Overview

* Introduces a state-of-the-art method for the study of the asymptotic behavior of solutions to evolution partial differential equations.

* Written by established mathematicians at the forefront of their field, this blend of delicate analysis and broad application is ideal for a course or seminar in asymptotic analysis and nonlinear PDEs.

* Well-organized text with detailed index and bibliography, suitable as a course text or reference volume.

Read More Show Less

Editorial Reviews

From the Publisher

"The authors are famous experts in the field of PDEs and blow-up techniques. In this book they present a stability theorem, the so-called S-theorem, and show, with several examples, how it may be applied to a wide range of stability problems for evolution equations. The book [is] aimed primarily aimed at advanced graduate students."

—Mathematical Reviews

"The book is very interesting and useful for researchers and students in mathematical physics...with basic knowledge in partial differential equations and functional analysis. A comprehensive index and bibliography are given" —-Revue Roumaine de Mathématiques Pures et Appliquées

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Product Details

Table of Contents

Introduction: A Stability Approach and Nonlinear Models.- Stability Theorem: A Dynamical Systems Approach.- Nonlinear Heat Equations: Basic Models and Mathematical Techniques.- Equation of Superslow Diffusion.- Quasilinear Heat Equations with Absorption. The Critical Exponent.- Porous Medium Equation with Critical Strong Absorption.- The Fast Diffusion Equation with Critical Exponent.- The Porous Medium Equation in an Exterior Domain.- Blow-up Free-Boundary Patterns for the Navier-Stokes Equations.- The Equation ut = uxx + uln2u: Regional Blow-up.- Blow-up in Quasilinear Heat Equations Described by Hamilton-Jacobi Equations.- A Fully Nonlinear Equation from Detonation Theory.- Further Applications to Second- and Higher-Order Equations.- References.- Index.

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