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Bifurcation in autonomous and nonaut...

Akhmet, Marat.

Bifurcation in autonomous and nonautonomous differential equations with discontinuities

紀錄類型:	書目-電子資源 : Monograph/item
正題名/作者:	Bifurcation in autonomous and nonautonomous differential equations with discontinuitiesby Marat Akhmet, Ardak Kashkynbayev.
作者:	Akhmet, Marat.
其他作者:	Kashkynbayev, Ardak.
出版者:	Singapore :Springer Singapore :2017.
面頁冊數:	xi, 166 p. :ill., digital ;24 cm.
Contained By:	Springer eBooks
標題:	Bifurcation theory.
電子資源:	http://dx.doi.org/10.1007/978-981-10-3180-9
ISBN:	9789811031809$q(electronic bk.)

Bifurcation in autonomous and nonautonomous differential equations with discontinuities
Akhmet, Marat.

Bifurcation in autonomous and nonautonomous differential equations with discontinuities[electronic resource] /by Marat Akhmet, Ardak Kashkynbayev. - Singapore :Springer Singapore :2017. - xi, 166 p. :ill., digital ;24 cm. - Nonlinear physical science,1867-8440. - Nonlinear physical science..

Introduction -- Hopf Bifurcation in Impulsive Systems -- Hopf Bifurcation in Fillopov Systems -- Nonautonomous Transcritical and Pitchfork Bifurcations in an Impulsive Bernoulli Equations -- Nonautonomous Transcritical and Pitchfork Bifurcations in Scalar Non-solvable Impulsive Differential Equations -- Nonautonomous Transcritical and Pitchfork Bifurcations in Bernoulli Equations with Piecewise Constant Argument of Generalized Type.

This book is devoted to bifurcation theory for autonomous and nonautonomous differential equations with discontinuities of different types. That is, those with jumps present either in the right-hand-side or in trajectories or in the arguments of solutions of equations. The results obtained in this book can be applied to various fields such as neural networks, brain dynamics, mechanical systems, weather phenomena, population dynamics, etc. Without any doubt, bifurcation theory should be further developed to different types of differential equations. In this sense, the present book will be a leading one in this field. The reader will benefit from the recent results of the theory and will learn in the very concrete way how to apply this theory to differential equations with various types of discontinuity. Moreover, the reader will learn new ways to analyze nonautonomous bifurcation scenarios in these equations. The book will be of a big interest both for beginners and experts in the field. For the former group of specialists, that is, undergraduate and graduate students, the book will be useful since it provides a strong impression that bifurcation theory can be developed not only for discrete and continuous systems, but those which combine these systems in very different ways. The latter group of specialists will find in this book several powerful instruments developed for the theory of discontinuous dynamical systems with variable moments of impacts, differential equations with piecewise constant arguments of generalized type and Filippov systems. A significant benefit of the present book is expected to be for those who consider bifurcations in systems with impulses since they are presumably nonautonomous systems.

ISBN: 9789811031809$q(electronic bk.)

Standard No.: 10.1007/978-981-10-3180-9doiSubjects--Topical Terms:

185804
Bifurcation theory.

LC Class. No.: QA380

Dewey Class. No.: 515.392

Bifurcation in autonomous and nonautonomous differential equations with discontinuities
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520 $a This book is devoted to bifurcation theory for autonomous and nonautonomous differential equations with discontinuities of different types. That is, those with jumps present either in the right-hand-side or in trajectories or in the arguments of solutions of equations. The results obtained in this book can be applied to various fields such as neural networks, brain dynamics, mechanical systems, weather phenomena, population dynamics, etc. Without any doubt, bifurcation theory should be further developed to different types of differential equations. In this sense, the present book will be a leading one in this field. The reader will benefit from the recent results of the theory and will learn in the very concrete way how to apply this theory to differential equations with various types of discontinuity. Moreover, the reader will learn new ways to analyze nonautonomous bifurcation scenarios in these equations. The book will be of a big interest both for beginners and experts in the field. For the former group of specialists, that is, undergraduate and graduate students, the book will be useful since it provides a strong impression that bifurcation theory can be developed not only for discrete and continuous systems, but those which combine these systems in very different ways. The latter group of specialists will find in this book several powerful instruments developed for the theory of discontinuous dynamical systems with variable moments of impacts, differential equations with piecewise constant arguments of generalized type and Filippov systems. A significant benefit of the present book is expected to be for those who consider bifurcations in systems with impulses since they are presumably nonautonomous systems.
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