Symmetry and separation of variables /

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Bibliographic Details
Author / Creator:Miller, Willard.
Imprint:Cambridge [Cambridgeshire] ; New York, NY, USA : Cambridge University Press, 1984.
Description:1 online resource (xxx, 285 pages) : illustrations
Language:English
Series:Encyclopedia of mathematics and its applications ; v. 4. Section, Special functions
Encyclopedia of mathematics and its applications ; v. 4.
Encyclopedia of mathematics and its applications. Section, Special functions.
Subject:Physik
Symmetry (Physics)
Functions, Special.
Differential equations, Partial -- Numerical solutions.
Separation of variables.
SCIENCE -- Physics -- Mathematical & Computational.
Differential equations, Partial -- Numerical solutions.
Functions, Special.
Separation of variables.
Symmetry (Physics)
Partielle Differentialgleichung
Spezielle Funktion
Differentialgleichung
Electronic books.
Format: E-Resource Book
URL for this record:http://pi.lib.uchicago.edu/1001/cat/bib/11200275
Hidden Bibliographic Details
ISBN:9781107087460
1107087465
9781107325623
1107325625
9781107093690
1107093694
1139886061
9781139886062
1107102286
9781107102286
1107099757
9781107099753
0521302242
9780521302241
Notes:Imprint from label on title page verso. Imprint on t.p.: Reading, Mass. : Addison-Wesley, Advanced Book Program, 1977.
Publication taken over by Cambridge University Press in 1984 with a new copyright date.
Includes bibliographical references (pages 275-280) and index.
English.
Print version record.
Summary:This 1977 volume is concerned with the group-theoretic approach to special functions.
Other form:Print version: Miller, Willard. Symmetry and separation of variables. Cambridge [Cambridgeshire] ; New York, NY, USA : Cambridge University Press, 1984 0521302242
Table of Contents:
  • Cover; Half Title; Series Page; Title; Copyright; Contents; Editor's Statement; Foreword; References; Preface; CHAPTER 1 The Helmholtz Equation; 1.0 Introduction; 1.1 The Symmetry Group of the Helmholtz Equation; 1.2 Separation of Variables for the Helmholtz Equation; 1.3 Expansion Formulas Relating Separable Solutions; 1.4 Separation of Variables for the Klein-Gordon Equation; 1.5 Expansion Formulas for Solutions of the Klein-Gordon Equation; 1.6 The Complex Helmholtz Equation; 1.7 Weisner's Method for the Complex Helmholtz Equation; Exercises; CHAPTER 2 The Schrödinger and Heat Equations
  • 7. The Lauricella Functions8. Mathieu Functions; APPENDIX C Elliptic Functions; REFERENCES; Subject Index