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Series and Products in the Development of Mathematics: Volume 2 - Ranjan Roy

Series and Products in the Development of Mathematics: Volume 2

(Autor)

Buch | Softcover
476 Seiten
2021 | 2nd Revised edition
Cambridge University Press (Verlag)
978-1-108-70937-8 (ISBN)
CHF 88,95 inkl. MwSt
This second edition of Sources in the Development of Mathematics, now in two volumes, traces the development of series and products from 1380–2000 through the interconnected concepts and results of unsung and celebrated mathematicians. This second volume treats more advanced topics, with extensive added context, detail, and primary source material.
This is the second volume of a two-volume work that traces the development of series and products from 1380 to 2000 by presenting and explaining the interconnected concepts and results of hundreds of unsung as well as celebrated mathematicians. Some chapters deal with the work of primarily one mathematician on a pivotal topic, and other chapters chronicle the progress over time of a given topic. This updated second edition of Sources in the Development of Mathematics adds extensive context, detail, and primary source material, with many sections rewritten to more clearly reveal the significance of key developments and arguments. Volume 1, accessible even to advanced undergraduate students, discusses the development of the methods in series and products that do not employ complex analytic methods or sophisticated machinery. Volume 2 examines more recent results, including deBranges' resolution of Bieberbach's conjecture and Nevanlinna's theory of meromorphic functions.

Ranjan Roy is the Ralph C. Huffer Professor of Mathematics and Astronomy at Beloit College, Wisconsin, and has published papers and reviews on Riemann surfaces, differential equations, fluid mechanics, Kleinian groups, and the development of mathematics. He has received the Allendoerfer Prize, the Wisconsin MAA teaching award, and the MAA Haimo Award for Distinguished Mathematics Teaching, and was twice named Teacher of the Year at Beloit College. He co-authored Special Functions (2001) with George Andrews and Richard Askey and co-authored chapters in the NIST Handbook of Mathematical Functions (2010); he also authored Elliptic and Modular Functions from Gauss to Dedekind to Hecke (2017) and the first edition of this book, Sources in the Development of Mathematics (2011).

25. q-series; 26. Partitions; 27. q-Series and q-orthogonal polynomials; 28. Dirichlet L-series; 29. Primes in arithmetic progressions; 30. Distribution of primes: early results; 31. Invariant theory: Cayley and Sylvester; 32. Summability; 33. Elliptic functions: eighteenth century; 34. Elliptic functions: nineteenth century; 35. Irrational and transcendental numbers; 36. Value distribution theory; 37. Univalent functions; 38. Finite fields; Bibliography; Index.

Erscheinungsdatum
Zusatzinfo Worked examples or Exercises
Verlagsort Cambridge
Sprache englisch
Maße 176 x 253 mm
Gewicht 890 g
Themenwelt Sachbuch/Ratgeber Natur / Technik
Mathematik / Informatik Mathematik Geschichte der Mathematik
ISBN-10 1-108-70937-0 / 1108709370
ISBN-13 978-1-108-70937-8 / 9781108709378
Zustand Neuware
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