Book contents
- Frontmatter
- Contents
- Editor's Statement
- Foreword by Felix E. Browder
- Preface
- Chapter 0 Preliminaries
- Chapter 1 Introduction
- Chapter 2 The Cauchy Problem
- Chapter 3 The Initial-Value Problem
- Chapter 4 The Initial-Boundary-Value Problem for the Quarter Plane with Temperature-Boundary Specification
- Chapter 5 The Initial-Boundary-Value Problem for the Quarter Plane with Heat-Flux-Boundary Specification
- Chapter 6 The Initial-Boundary-Value Problem for the Semi-Infinite Strip with Temperature-Boundary Specification and Heat-Flux-Boundary Specification
- Chapter 7 The Reduction of Some Initial-Boundary-Value Problems for the Semi-Infinite Strip, to Integral Equations: Some Exercises
- Chapter 8 Integral Equations
- Chapter 9 Solutions of Boundary-Value Problems for All Times and Periodic Solutions
- Chapter 10 Analyticity of Solutions
- Chapter 11 Continuous Dependence upon the Data for Some State-Estimation Problems
- Chapter 12 Some Numerical Methods for Some State-Estimation Problems
- Chapter 13 Determination of an Unknown Time-Dependent Diffusivity a(t) from Overspecified Data
- Chapter 14 Initial- and/or Boundary-Value Problems for General Regions with Hölder Continuous Boundaries
- Chapter 15 Some Properties of Solutions in General Domains
- Chapter 16 The Solution in a General Region with Temperature-Boundary Specification: The Method of Perron-Poincaré
- Chapter 17 The One-Phase Stefan Problem with Temperature-Boundary Specification
- Chapter 18 The One-Phase Stefan Problem with Flux-Boundary Specification: Some Exercises
- Chapter 19 The Inhomogeneous Heat Equation ut = uxx + f(x, t)
- Chapter 20 An Application of the Inhomogeneous Heat Equation: The Equation ut = uxx + F(x,t,u,ux)
- Some References to the Literature on ℒ(u) ≡ uxx – ut
- Symbol Index
- Subject Index
Foreword by Felix E. Browder
Published online by Cambridge University Press: 05 February 2012
- Frontmatter
- Contents
- Editor's Statement
- Foreword by Felix E. Browder
- Preface
- Chapter 0 Preliminaries
- Chapter 1 Introduction
- Chapter 2 The Cauchy Problem
- Chapter 3 The Initial-Value Problem
- Chapter 4 The Initial-Boundary-Value Problem for the Quarter Plane with Temperature-Boundary Specification
- Chapter 5 The Initial-Boundary-Value Problem for the Quarter Plane with Heat-Flux-Boundary Specification
- Chapter 6 The Initial-Boundary-Value Problem for the Semi-Infinite Strip with Temperature-Boundary Specification and Heat-Flux-Boundary Specification
- Chapter 7 The Reduction of Some Initial-Boundary-Value Problems for the Semi-Infinite Strip, to Integral Equations: Some Exercises
- Chapter 8 Integral Equations
- Chapter 9 Solutions of Boundary-Value Problems for All Times and Periodic Solutions
- Chapter 10 Analyticity of Solutions
- Chapter 11 Continuous Dependence upon the Data for Some State-Estimation Problems
- Chapter 12 Some Numerical Methods for Some State-Estimation Problems
- Chapter 13 Determination of an Unknown Time-Dependent Diffusivity a(t) from Overspecified Data
- Chapter 14 Initial- and/or Boundary-Value Problems for General Regions with Hölder Continuous Boundaries
- Chapter 15 Some Properties of Solutions in General Domains
- Chapter 16 The Solution in a General Region with Temperature-Boundary Specification: The Method of Perron-Poincaré
- Chapter 17 The One-Phase Stefan Problem with Temperature-Boundary Specification
- Chapter 18 The One-Phase Stefan Problem with Flux-Boundary Specification: Some Exercises
- Chapter 19 The Inhomogeneous Heat Equation ut = uxx + f(x, t)
- Chapter 20 An Application of the Inhomogeneous Heat Equation: The Equation ut = uxx + F(x,t,u,ux)
- Some References to the Literature on ℒ(u) ≡ uxx – ut
- Symbol Index
- Subject Index
Summary
The one-dimensional heat equation, first studied by Fourier at the beginning of the 19th century in his celebrated volume on the analytical theory of heat, has become during the intervening century and a half the paradigm for the very extensive study of parabolic partial differential equations, linear and nonlinear. The present volume is a systematic development of a variety of aspects of this paradigm, of which many have not yet received an extension to the multidimensional space-variable case. Of particular interest are the discussions of free-boundary-value problems such as the one-phase Stefan problem, inverse problems, and some classes of not-well-posed problems.
This type of treatment using concrete analytic machinery for the detailed study of this very familiar and widely applicable partial differential equation should prove valuable as a textbook for courses that try to present basic aspects of partial differential equations in simple but useful cases (like the heat equation in one dimension), where the basic concepts are relatively unobscured by the technical problems and complications encountered in the more general classes of equations. The treatment is reasonably complete and can be followed by scientists who do not necessarily have the mathematical experience necessary for some of the more elaborate treatises on general parabolic equations. In addition, the relative completeness of the presentation for this case makes the volume suitable as a reference book for specific results in this area, for which a reference by specialization of more general results is inappropriate.
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- The One-Dimensional Heat Equation , pp. xxi - xxiiPublisher: Cambridge University PressPrint publication year: 1984