Difference between revisions of "Book:Thomas Ernst/A Comprehensive Treatment of q-Calculus"
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Revision as of 16:57, 16 June 2016
Thomas Ernst: A Comprehensive Treatment of q-Calculus
Published $2012$, Springer Basel.
Contents
- Introduction
- 1.1 A survey of the chapters
- 1.2 What is $q$-calculus?
- 1.2.1 Elementary series manipulation
- 1.3 Update on $q$-calculus
- 1.3.1 Current textbooks on this subject
- 1.3.2 Comparison with complex analysis
- 1.4 Comparison with nonstandard analysis
- 1.5 Comparison with the units of physics
- 1.6 Analogies between $q$-analysis and analysis
- 1.7 The first $q$-functions
- 2 The different languages of $q$-calculus
- 2.1 Schools --- traditions
- 2.2 Ramifications and minor Schools
- 2.2.1 Different notations
- 2.3 Finite differences and Bernoulli numbers
- 2.4 Umbral calculus, interpolation theory
- 2.5 Elliptic and Theta Schools and notations, the oldest roots -- the $q$-forerunners
- 2.6 Trigonometry, prosthaphaeresis, logarithms
- 2.7 The development of calculus
- 2.8 The Faulhaber mathematics
- 2.9 Descartes, Leibniz, Hindenburg, Arbogast
- 2.10 The Fakultäten
- 2.11 Königsberg School
- 2.12 Viennese School
- 2.13 Göttingen School
- 2.14 The combinatorial School: Gudermann, Grünert
- 2.15 Heidelberg School
- 2.16 Weierstraß, formal power series and the $\Gamma$ function
- 2.17 Halle $q$-analysis School
- 2.18 Jakob Friedrich Fries, Martin Ohm, Babbage, Peacock and Herschel
- 2.19 Different styles in $q$-analysis
- 3 Pre $q$-Analysis
- 3.1 The early connection between analytic number theory and $q$-series
- 3.2 Some aspects of combinatorial identities
- 3.2.1 Faà di Bruno formula
- 3.3 The duality between Bernoulli and Stirling numbers
- 3.4 Tangent numbers, Euler numbers
- 3.5 The occurrence of binomial coefficient identities in the literature
- 3.6 Nineteenth century: Catalna, Grigoriew, Imchenetsky
- 3.7 A short history of hypergeometric series
- 3.7.1 The $\Gamma$ function
- 3.7.2 Balanced and well-poised hypergeometric series
- 3.7.3 Fractional differentiation
- 3.7.4 Newton, Taylor, Stirling, Montmort
- 3.7.5 Euler's contribution
- 3.7.6 Vandermonde and Pfaffian summation formulas
- 3.7.7 Conic sections in the seventeenth century
- 3.7.8 The infinity in England
- 3.7.9 The infinity in the hands of Euler
- 3.7.10 The infinity, the binomial coefficients
- 3.7.11 Gauß' contribution
- 3.7.12 After Gauß: Clausen, Jacobi
- 3.7.13 Kummer's contribution
- 3.7.14 Cauchy, Riemann, Heine, Thomae, Papperitz
- 3.7.15 1800-1914; Sonine, Goursat, Stieltjes, Schafheitlin, Pochhammer, Mellin
- 3.7.16 First half of the twentieth century; England, USA
- 3.7.17 Special functions defined by integrals
- 3.7.18 Second half of the twentieth century
- 3.8 The Jacobi theta functions; different notations; properties
- 3.9 Meromorphic continuation and Riemann surfaces
- 3.10 Wave equation
- 3.11 Orthogonal polynomials
- 3.11.1 Legendre-d'Allonville-Murphy polynomials
- 3.11.2 Laguerre-Abel-Sonine-Murphy-Chebyshev-Halphen-Szegő polynomials
- 3.11.3 Jacobi polynomials
- 3.11.4 Hermite polynomials
- 4 The $q$-umbral calculus and semigroups. The Nørlund calculus of finite differences
- 4.1 The $q$-umbral calculus and semigroups
- 4.2 Finite differences
- 4.3 $q$-Appell polynomials
- 4.3.1 The generalized $q$-Bernoulli polynomials
- 4.3.2 The Ward $q$-Bernoulli numbers
- 4.3.3 The generalized JHC $q$-Bernoulli polynomials
- 4.3.4 NWA $q$-Euler polynomials
- 4.3.5 The NWA generalized $q$-Euler numbers
- 4.3.6 Several variables; $n$ negative
- 4.3.7 $q$-Euler-Maclaurin expansions
- 4.3.8 JHC polynomials of many variables; negative order
- 4.3.9 JHC $q$-Euler-Maclaurin expansions
- 4.3.10 Euler symbolic formula
- 4.3.11 Complementary argument theorems
