Special Functions,9780521623216

Special Functions

by
ISBN13: 9780521623216
ISBN10: 0521623219
Format: Hardcover
Pub. Date: 1999-01-13
Publisher(s): Cambridge University Press
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Summary

Special functions, natural generalizations of the elementary functions, have been studied for centuries. The greatest mathematicians, among them Euler, Gauss, Legendre, Eisenstein, Riemann, and Ramanujan, have laid the foundations for this beautiful and useful area of mathematics. This treatise presents an overview of special functions, focusing primarily on hypergeometric functions and the associated hypergeometric series, including Bessel functions and classical orthogonal polynomials, using the basic building block of the gamma function. In addition to relatively new work on gamma and beta functions, such as Selberg's multidimensional integrals, many important but relatively unknown nineteenth century results are included. Other topics include q-extensions of beta integrals and of hypergeometric series, Bailey chains, spherical harmonics, and applications to combinatorial problems. The authors provide organizing ideas, motivation, and historical background for the study and application of some important special functions. This clearly expressed and readable work can serve as a learning tool and lasting reference for students and researchers in special functions, mathematical physics, differential equations, mathematical computing, number theory, and combinatorics.

Table of Contents

Preface xiii
The Gamma and Beta Functions
1(60)
The Gamma and Beta Integrals and Functions
2(7)
The Euler Reflection Formula
9(6)
The Hurwitz and Riemann Zeta Functions
15(3)
Stirling's Asymptotic Formula
18(4)
Gauss's Multiplication Formula for Γ (mx)
22(4)
Integral Representations for Log Γ (x) and ψ (x)
26(3)
Kummer's Fourier Expansion of Log Γ (x)
29(3)
Integrals of Dirichlet and Volumes of Ellipsoids
32(2)
The Bohr-Mollerup Theorem
34(2)
Gauss and Jacobi Sums
36(7)
A Probabilistic Evaluation of the Beta Function
43(1)
The p-adic Gamma Function
44(17)
Exercises
46(15)
The Hypergeometric Functions
61(63)
The Hypergeometric Series
61(4)
Euler's Integral Representation
65(8)
The Hypergeometric Equation
73(12)
The Barnes Integral for the Hypergeometric Function
85(9)
Contiguous Relations
94(8)
Dilogarithms
102(5)
Binomial Sums
107(2)
Dougall's Bilateral Sum
109(2)
Fractional Integration by Parts and Hypergeometric Integrals
111(13)
Exercises
114(10)
Hypergeometric Transformations and Identities
124(63)
Quadratic Transformations
125(7)
The Arithmetic-Geometric Mean and Elliptic Integrals
132(8)
Transformations of Balanced Series
140(3)
Whipple's Transformation
143(4)
Dougall's Formula and Hypergeometric Identities
147(3)
Integral Analogs of Hypergeometric Sums
150(4)
Contiguous Relations
154(3)
The Wilson Polynomials
157(3)
Quadratic Transformations - Riemann's View
160(3)
Indefinite Hypergeometric Summation
163(3)
The W - Z Method
166(8)
Contiguous Relations and Summation Methods
174(13)
Exercises
176(11)
Bessel Functions and Confluent Hypergeometric Functions
187(53)
The Confluent Hypergeometric Equation
188(4)
Barnes's Integral for 1F1
192(3)
Whittaker Functions
195(1)
Examples of 1F1 and Whittaker Functions
196(3)
Bessel's Equation and Bessel Functions
199(3)
Recurrence Relations
202(1)
Integral Representations of Bessel Functions
203(6)
Asymptotic Expansions
209(1)
Fourier Transforms and Bessel Functions
210(3)
Addition Theorems
213(3)
Integrals of Bessel Functions
216(6)
The Modified Bessel Functions
222(1)
Nicholson's Integral
223(2)
Zeros of Bessel Functions
225(4)
Monotonicity Properties of Bessel Functions
229(2)
Zero-Free Regions for 1F1 Functions
231(9)
Exercises
234(6)
Orthogonal Polynomials
240(37)
Chebyshev Polynomials
240(4)
Recurrence
244(4)
Gauss Quadrature
248(5)
Zeros of Orthogonal Polynomials
253(3)
Continued Fractions
256(3)
Kernel Polynomials
259(4)
Parseval's Formula
263(3)
The Moment-Generating Function
266(11)
Exercises
269(8)
Special Orthogonal Polynomials
277(78)
Hermite Polynomials
278(4)
Laguerre Polynomials
282(11)
Jacobi Polynomials and Gram Determinants
293(4)
Generating Functions for Jacobi Polynomials
297(9)
Completeness of Orthogonal Polynomials
306(4)
Asymptotic Behavior of Pn(α, β) (x) for Large n
310(3)
Integral Representations of Jacobi Polynomials
313(3)
Linearization of Products of Orthogonal Polynomials
316(7)
Matching Polynomials
323(7)
The Hypergeometric Orthogonal Polynomials
330(4)
An Extension of the Ultraspherical Polynomials
334(21)
Exercises
339(16)
Topics in Orthogonal Polynomials
355(46)
Connection Coefficients
356(7)
Rational Functions with Positive Power Series Coefficients
363(8)
Positive Polynomial Sums from Quadrature and Vietoris's Inequality
371(10)
Positive Polynomial Sums and the Bieberback Conjecture
381(3)
A Theorem of Turan
384(4)
Positive Summability of Ultraspherical Polynomials
388(3)
The Irrationality of ζ (3)
391(10)
Exercises
395(6)
The Selberg Integral and Its Applications
401(44)
Selberg's and Aomoto's Integrals
402(1)
Aomoto's Proof of Selberg's Formula
402(5)
Extensions of Aomoto's Integral Formula
407(4)
Anderson's Proof of Selberg's Formula
411(4)
A Problem of Stieltjes and the Discriminant of a Jacobi Polynomial
415(4)
Siegel's Inequality
419(6)
The Stieltjes Problem on the Unit Circle
425(1)
Constant-Term Identities
426(2)
Nearly Poised 3F2 Identities
428(2)
The Hasse-Davenport Relation
430(4)
A Finite-Field Analog of Selberg's Integral
434(11)
Exercises
439(6)
Spherical Harmonics
445(36)
Harmonic Polynomials
445(2)
The Laplace Equation in Three Dimensions
447(2)
Dimension of the Space of Harmonic Polynomials of Degree k
449(2)
Orthogonality of Harmonic Polynomials
451(1)
Action of an Orthogonal Matrix
452(2)
The Addition Theorem
454(4)
The Funk-Hecke Formula
458(1)
The Addition Theorem for Ultraspherical Polynomials
459(4)
The Poisson Kernel and Dirichlet Problem
463(1)
Fourier Transforms
464(2)
Finite-Dimensional Representations of Compact Groups
466(3)
The Group SU (2)
469(2)
Representations of SU (2)
471(2)
Jacobi Polynomials as Matrix Entries
473(1)
An Addition Theorem
474(2)
Relation of SU (2) to the Rotation Group SO (3)
476(5)
Exercises
478(3)
Introduction to q-Series
481(72)
The q-Integral
485(2)
The q-Binomial Theorem
487(6)
The q-Gamma Function
493(3)
The Triple Product Identity
496(5)
Ramanujan's Summation Formula
501(5)
Representations of Numbers as Sums of Squares
506(2)
Elliptic and Theta Functions
508(5)
q-Beta Integrals
513(7)
Basic Hypergeometric Series
520(3)
Basic Hypergeometric Identities
523(4)
q-Ultraspherical Polynomials
527(5)
Mellin Transforms
532(21)
Exercises
542(11)
Partitions
553(24)
Background on Partitions
553(2)
Partition Analysis
555(2)
A Library for the Partition Analysis Algorithm
557(2)
Generating Functions
559(4)
Some Results on Partitions
563(2)
Graphical Methods
565(4)
Congruence Properties of Partitions
569(8)
Exercises
573(4)
Bailey Chains
577(18)
Rogers's Second Proof of the Rogers-Ramanujan Identities
577(5)
Bailey's Lemma
582(4)
Watson's Transformation Formula
586(3)
Other Applications
589(6)
Exercises
590(5)
A Infinite Products 595(4)
Infinite Products
595(4)
Exercises
597(2)
B Summability and Fractional Integration 599(12)
Abel and Cesaro Means
599(3)
The Cesaro Means (C, α)
602(2)
Fractional Integrals
604(1)
Historical Remarks
605(6)
Exercises
607(4)
C Asymptotic Expansions 611(6)
Asymptotic Expansion
611(1)
Properties of Asymptotic Expansions
612(2)
Watson's Lemma
614(1)
The Ratio of Two Gamma Functions
615(2)
Exercises
616(1)
D Euler-Maclaurin Summation Formula 617(12)
Introduction
617(2)
The Euler-Maclaurin Formula
619(2)
Applications
621(2)
The Poisson Summation Formula
623(6)
Exercises
627(2)
E Lagrange Inversion Formula 629(8)
Reversion of Series
629(1)
A Basic Lemma
630(1)
Lambert's Identity
631(1)
Whipple's Transformation
632(5)
Exercises
634(3)
F Series Solutions of Differential Equations 637(4)
Ordinary Points
638(1)
Singular Points
638(1)
Regular Singular Points
639(2)
Bibliography 641(14)
Index 655(4)
Subject Index 659(2)
Symbol Index 661

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