Handbook of Complex Analysis
Handbook of Complex Analysis

Author: Reiner Kuhnau

Publisher: Elsevier

Published: 2004-12-09

Total Pages: 876

ISBN-13: 0080495176

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Geometric Function Theory is that part of Complex Analysis which covers the theory of conformal and quasiconformal mappings. Beginning with the classical Riemann mapping theorem, there is a lot of existence theorems for canonical conformal mappings. On the other side there is an extensive theory of qualitative properties of conformal and quasiconformal mappings, concerning mainly a prior estimates, so called distortion theorems (including the Bieberbach conjecture with the proof of the Branges). Here a starting point was the classical Scharz lemma, and then Koebe's distortion theorem. There are several connections to mathematical physics, because of the relations to potential theory (in the plane). The Handbook of Geometric Function Theory contains also an article about constructive methods and further a Bibliography including applications eg: to electroxtatic problems, heat conduction, potential flows (in the plane). · A collection of independent survey articles in the field of GeometricFunction Theory · Existence theorems and qualitative properties of conformal and quasiconformal mappings · A bibliography, including many hints to applications in electrostatics, heat conduction, potential flows (in the plane).

Pi: A Source Book
Pi: A Source Book

Author: J.L. Berggren

Publisher: Springer

Published: 2014-01-13

Total Pages: 812

ISBN-13: 1475742177

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This book documents the history of pi from the dawn of mathematical time to the present. One of the beauties of the literature on pi is that it allows for the inclusion of very modern, yet accessible, mathematics. The articles on pi collected herein fall into various classes. First and foremost there is a selection from the mathematical and computational literature of four millennia. There is also a variety of historical studies on the cultural significance of the number. Additionally, there is a selection of pieces that are anecdotal, fanciful, or simply amusing. For this new edition, the authors have updated the original material while adding new material of historical and cultural interest. There is a substantial exposition of the recent history of the computation of digits of pi, a discussion of the normality of the distribution of the digits, and new translations of works by Viete and Huygen.

Handbook of Mathematical Functions
Handbook of Mathematical Functions

Author: Milton Abramowitz

Publisher: Courier Corporation

Published: 2012-04-30

Total Pages: 1068

ISBN-13: 0486158241

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A classic resource for working with special functions, standard trig, and exponential logarithmic definitions and extensions, it features 29 sets of tables, some to as high as 20 places.

Organic Mathematics
Organic Mathematics

Author: Jonathan M. Borwein

Publisher: American Mathematical Soc.

Published: 1997

Total Pages: 426

ISBN-13: 9780821806685

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This volume is the hardcopy version of the electronic manuscript, "Proceedings of the Organic Mathematics Workshop" held at Simon Fraser University in December 1995 (www.cecm.sfu.ca/organics). The book provides a fixed, easily referenced, and permanent version of what is otherwise an evolving document. Contained in this work is a collection of articles on experimental and computational mathematics contributed by leading mathematicians around the world. The papers span a variety of mathematical fields - from juggling to differential equations to prime number theory. The book also contains biographies and photos of the contributing mathematicians and an in-depth characterization of organic mathematics.

Scientia Magna, Vol. 9, No. 3, 2013
Scientia Magna, Vol. 9, No. 3, 2013

Author: Zhang Wenpeng

Publisher: Infinite Study

Published:

Total Pages: 129

ISBN-13: 1599732823

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Papers on some characterization of Smarandache boolean near-ring with sub-direct sum structure, three classes of exact solutions to Klein-Gordon-Schrodinger equation, a short interval result for the extension of the exponential divisor function, a function in the space of univalent function of Bazilevic type, Smarandache bisymmetric geometric determinat sequences, and other topics. Contributors: Aldous Cesar F. Bueno, D. Vamshee Krishna, T. Ramreddy, Hai-Long Li, Qian-Li Yangand, S. Panayappan, Hongming Xia, N. Kannappa, P. Tamilvani, and others.