Difference between revisions of "Book:Victor Kac/Quantum Calculus"
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===Contents=== | ===Contents=== | ||
| + | :Introduction | ||
| + | :1 $q$-Derivative and $h$-Derivative | ||
| + | ::$(1.1)$ | ||
| + | ::$(1.2)$ | ||
| + | ::$(1.3)$ | ||
| + | ::$(1.4)$ | ||
| + | ::[[Q-derivative|$(1.5)$]] | ||
| + | ::$(1.6)$ | ||
| + | ::$(1.7)$ | ||
| + | ::$(1.8)$ | ||
| + | ::$(1.9)$ | ||
| + | ::$(1.10)$ | ||
| + | ::$(1.11)$ | ||
| + | ::$(1.12)$ | ||
| + | ::$(1.13)$ | ||
| + | ::$(1.14)$ | ||
| + | ::$(1.15)$ | ||
| + | :2 Generalized Taylor's Formula for Polynomials | ||
| + | :3 $q$-Analogue of $(x-a)^n$, $n$ an Integer, and $q$-Derivatives of Binomials | ||
| + | :4 $q$-Taylor's Formula for Polynomials | ||
| + | :5 Gauss's Binomial Formula and a Noncommutative Binomial Formula | ||
| + | :6 Properties of $q$-Binomial Coefficients | ||
| + | :7 $q$-Binomial Coefficients and Linear Algebra over Finite Fields | ||
| + | :8 $q$-Taylor's Formula for Formal Power Series and Heine's Binomial Formula | ||
| + | :9 Two Euler's Identities and two $q$-Exponential Functions | ||
| + | :10 $q$-Trigonometric functions | ||
| + | :11 Jacobi's Triple Product Identity | ||
| + | :12 Classical Partition Function and Euler's Product Formula | ||
| + | :13 $q$-Hypergeometric Functions and Heine's Formula | ||
| + | :14 More on Heine's Formula and the General Binomial | ||
| + | :15 Ramanujan Product Formula | ||
| + | :16 Explicit Formulas for Sums of Two and of Four Squares | ||
| + | :17 Explicit Formulas for Sums of Two of Four Triangular Numbers | ||
| + | :18 $q$-Antiderivatives | ||
| + | :19 Jackson Integral | ||
| + | :20 Fundamental Theorem of $q$-Calculus and Integration by Parts | ||
| + | :21 $q$-Gamma and $q$-Beta Functions | ||
| + | :22 $h$-Derivative and $h$-Integral | ||
| + | :23 Bernoulli Polynomials and Bernoulli Numbers | ||
| + | :24 Sums of Powers | ||
| + | :25 Euler-Maclaurin Formula | ||
| + | :26 Symmetric Quantum Calculus | ||
| + | :Appendix: A List of $q$-Antiderivatives | ||
| + | :Literature | ||
| + | :Index | ||
[[Category:Book]] | [[Category:Book]] | ||
Revision as of 04:15, 26 December 2016
Victor Kac and Pokman Cheung: Quantum Calculus
Published $2002$, Springer.
Contents
- Introduction
- 1 $q$-Derivative and $h$-Derivative
- $(1.1)$
- $(1.2)$
- $(1.3)$
- $(1.4)$
- $(1.5)$
- $(1.6)$
- $(1.7)$
- $(1.8)$
- $(1.9)$
- $(1.10)$
- $(1.11)$
- $(1.12)$
- $(1.13)$
- $(1.14)$
- $(1.15)$
- 2 Generalized Taylor's Formula for Polynomials
- 3 $q$-Analogue of $(x-a)^n$, $n$ an Integer, and $q$-Derivatives of Binomials
- 4 $q$-Taylor's Formula for Polynomials
- 5 Gauss's Binomial Formula and a Noncommutative Binomial Formula
- 6 Properties of $q$-Binomial Coefficients
- 7 $q$-Binomial Coefficients and Linear Algebra over Finite Fields
- 8 $q$-Taylor's Formula for Formal Power Series and Heine's Binomial Formula
- 9 Two Euler's Identities and two $q$-Exponential Functions
- 10 $q$-Trigonometric functions
- 11 Jacobi's Triple Product Identity
- 12 Classical Partition Function and Euler's Product Formula
- 13 $q$-Hypergeometric Functions and Heine's Formula
- 14 More on Heine's Formula and the General Binomial
- 15 Ramanujan Product Formula
- 16 Explicit Formulas for Sums of Two and of Four Squares
- 17 Explicit Formulas for Sums of Two of Four Triangular Numbers
- 18 $q$-Antiderivatives
- 19 Jackson Integral
- 20 Fundamental Theorem of $q$-Calculus and Integration by Parts
- 21 $q$-Gamma and $q$-Beta Functions
- 22 $h$-Derivative and $h$-Integral
- 23 Bernoulli Polynomials and Bernoulli Numbers
- 24 Sums of Powers
- 25 Euler-Maclaurin Formula
- 26 Symmetric Quantum Calculus
- Appendix: A List of $q$-Antiderivatives
- Literature
- Index
