Synopses & Reviews
This introduction to Fourier and transform methods emphasizes basic techniques rather than theoretical concepts. It explains the essentials of the Fourier method and presents detailed considerations of modeling and solutions of physical problems. All solutions feature well-drawn outlines that allow students to follow an appropriate sequence of steps, and many of the exercises include answers.
The chief focus of this text is the application of the Fourier method to physical problems, which are described mathematically in terms of boundary value problems. Problems involving separation of variables, Sturm-Liouville theory, superposition, and boundary complaints are addressed in a logical sequence. Multidimensional Fourier series solutions and Fourier integral solutions on unbounded domains are followed by the special functions of Bessel and Legendre, which are introduced to deal with the cylindrical and spherical geometry of boundary value problems. Students and professionals in mathematics, the physical sciences, and engineering will find this volume an excellent study guide and resource.
Synopsis
This volume introduces Fourier and transform methods for solutions to boundary value problems associated with natural phenomena. It emphasizes basics and techniques rather than theory and includes exercises with solutions. 1990 edition.
Synopsis
This volume introduces Fourier and transform methods for solutions to boundary value problems associated with natural phenomena. It emphasizes basics and techniques rather than theory and includes exercises with solutions. 1990 edition.
Table of Contents
1. Linear Differential Equations2. Orthogonal Sets of Functions3. Fourier Series4. Fourier Integrals5. Bessel Functions6. Legendre Polynomials7. Integral Transforms8. Application of BVPs9. Additional ApplicationsReferencesAnswers to ExercisesAppendix 1. Selected IntegralsAppendix 2. Table of Laplace TransformsAppendix 3. Tables of Finite Fourier TransformsAppendix 4. Tables of Fourier TransformsIndex