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$q$-Series: Their Development and Application in Analysis, Number Theory, Combinatorics, Physics and Computer Algebra
About this Title
G. Andrews, Pennsylvania State University, University Park, PA
Publication: CBMS Regional Conference Series in Mathematics
Publication Year:
1986; Volume 66
ISBNs: 978-0-8218-0716-3 (print); 978-1-4704-2426-8 (online)
DOI: https://doi.org/10.1090/cbms/066
MathSciNet review: MR858826
MSC: Primary 11P57; Secondary 05A17, 05A30, 33A30, 68Q40, 82A67
ReadershipTable of Contents
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Front/Back Matter
Chapters
- Chapter 1. Found Opportunities
- Chapter 2. Classical Special Functions and L. J. Rogers
- Chapter 3. W. N. Bailey’s Extension of Rogers’s Work
- Chapter 4. Constant Terms
- Chapter 5. Integrals
- Chapter 6. Partitions and $q$-Series
- Chapter 7. Partitions and Constant Terms
- Chapter 8. The Hard Hexagon Model
- Chapter 9. Ramanujan
- Chapter 10. Computer Algebra
- Appendix A. W. Gosper’s Proof that $\lim _{q \to 1^{-}}\Gamma _q(x) = \Gamma (x)$
- Appendix B. Rogers’s Symmetric Expansion of $\psi (\lambda , \mu , \*** , q, \theta )$
- Appendix C. Ismail’s Proof of the $_1\psi _1$-Summation and Jacobi’s Triple Product Identity