Mathematical Analysis of Problems in the Natural Sciences

Mathematical Analysis of Problems in the Natural Sciences

by VladimirZorich (Author), Gerald G . Gould (Translator)

Synopsis

Based on a two-semester course aimed at illustrating various interactions of pure mathematics with other sciences, such as hydrodynamics, thermodynamics, statistical physics and information theory, this text unifies three general topics of analysis and physics, which are as follows: the dimensional analysis of physical quantities, which contains various applications including Kolmogorov's model for turbulence; functions of very large number of variables and the principle of concentration along with the non-linear law of large numbers, the geometric meaning of the Gauss and Maxwell distributions, and the Kotelnikov-Shannon theorem; and, finally, classical thermodynamics and contact geometry, which covers two main principles of thermodynamics in the language of differential forms, contact distributions, the Frobenius theorem and the Carnot-Caratheodory metric. It includes problems, historical remarks, and Zorich's popular article, Mathematics as language and method.

$75.83

Quantity

20+ in stock

More Information

Format: Hardcover
Pages: 135
Edition: 1st Edition.
Publisher: Springer
Published: 29 Oct 2010

ISBN 10: 3642148123
ISBN 13: 9783642148125

Media Reviews

From the reviews:

Vladimir Zorich has written a short and mathematically advanced text on the natural sciences as seen through mathematics. ... The text touches on many ideas: the dimension of a television signal, the molecular theory of matter, transmission line capacity, to name a few. ... if you want to see how mathematics is intertwined in nature and physics, how mathematics describes and explains our world, then this book paints that picture. (David S. Mazel, The Mathematical Association of America, August, 2011)

Author Bio
Vladimir A. Zorich is a distinguished Professor of Mathematics at the University of Moscow who solved the problem of global homeomorphism for space quasi-conformal mappings and provided its far-reaching generalizations.