Introduction to the qualitative theory of dynamical systems on surfaces

Introduction to the qualitative theory of dynamical systems on surfaces
Author :
Publisher : American Mathematical Soc.
Total Pages : 368
Release :
ISBN-10 : 0821897691
ISBN-13 : 9780821897690
Rating : 4/5 (690 Downloads)

Book Synopsis Introduction to the qualitative theory of dynamical systems on surfaces by : S. Kh Aranson E. V. Zhuzhoma

Download or read book Introduction to the qualitative theory of dynamical systems on surfaces written by S. Kh Aranson E. V. Zhuzhoma and published by American Mathematical Soc.. This book was released on with total page 368 pages. Available in PDF, EPUB and Kindle. Book excerpt: This book is an introduction to the qualitative theory of dynamical systems on manifolds of low dimension (on the circle and on surfaces). Along with classical results, it reflects the most significant achievements in this area obtained in recent times by Russian and foreign mathematicians whose work has not yet appeared in the monographic literature. The main stress here is put on global problems in the qualitative theory of flows on surfaces. Despite the fact that flows on surfaces have the same local structure as flows on the plane, they have many global properties intrinsic to multidimensional systems. This is connected mainly with the existence of nontrivial recurrent trajectories for such flows. The investigation of dynamical sytems on surfaces is therefore a natural stage in the transition to multidimensional dynamical systems. The reader of this book need by familiar only with basic courses indifferential equations and smooth manifolds. All the main definitions and concepts required for understanding the contents are given in the text. The results expounded can be used for investigating mathematical models of mechanical, physical, and other systems (billiards in polygons, the dynamics of a spinning top with nonholonomic constraints, the structure of liquid crystals, etc). The book should be useful not only to mathematicians in all areas, but also to specialists with a mathematical background who are studying dynamical processes: mechanical engineers, physicists, biologists, and so on.


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