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The convergence problem for dissipative autonomous systems = classical methods and recent advances /

紀錄類型:	書目-語言資料,印刷品 : Monograph/item
正題名/作者:	The convergence problem for dissipative autonomous systems/ by Alain Haraux, Mohamed Ali Jendoubi.
其他題名:	classical methods and recent advances /
作者:	Haraux, Alain.
其他作者:	Jendoubi, Mohamed Ali.
出版者:	Cham :Imprint: Springer, : 2015.,
面頁冊數:	xii, 142 p. :ill., digital ; : 24 cm.;
Contained By:	Springer eBooks
標題:	Ordinary Differential Equations. -
電子資源:	http://dx.doi.org/10.1007/978-3-319-23407-6
ISBN:	9783319234076

The convergence problem for dissipative autonomous systems = classical methods and recent advances /
Haraux, Alain.

The convergence problem for dissipative autonomous systemsclassical methods and recent advances /[electronic resource] :by Alain Haraux, Mohamed Ali Jendoubi. - Cham :Imprint: Springer,2015. - xii, 142 p. :ill., digital ;24 cm. - SpringerBriefs in mathematics,2191-8198. - SpringerBriefs in mathematics..

1 Introduction -- 2 Some basic tools -- 3 Background results on Evolution Equations -- 4 Uniformly damped linear semi-groups -- 5 Generalities on dynamical systems -- 6 The linearization method -- 7 Gradient-like systems -- 8 Liapunov's second method - invariance principle -- 9 Some basic examples -- 10 The convergence problem in finite dimensions -- 11 The infinite dimensional case -- 12 Variants and additional results.

The book investigates classical and more recent methods of study for the asymptotic behavior of dissipative continuous dynamical systems with applications to ordinary and partial differential equations, the main question being convergence (or not) of the solutions to an equilibrium. After reviewing the basic concepts of topological dynamics and the definition of gradient-like systems on a metric space, the authors present a comprehensive exposition of stability theory relying on the so-called linearization method. For the convergence problem itself, when the set of equilibria is infinite, the only general results that do not require very special features of the non-linearities are presently consequences of a gradient inequality discovered by S. Lojasiewicz. The application of this inequality jointly with the so-called Liapunov-Schmidt reduction requires a rigorous exposition of Semi-Fredholm operator theory and the theory of real analytic maps on infinite dimensional Banach spaces, which cannot be found anywhere in a readily applicable form. The applications covered in this short text are the simplest, but more complicated cases are mentioned in the final chapter, together with references to the corresponding specialized papers.

ISBN: 9783319234076

Standard No.: 10.1007/978-3-319-23407-6doiSubjects--Topical Terms:

670854
Ordinary Differential Equations.

LC Class. No.: QA295

Dewey Class. No.: 515.24

The convergence problem for dissipative autonomous systems = classical methods and recent advances /
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520 $a The book investigates classical and more recent methods of study for the asymptotic behavior of dissipative continuous dynamical systems with applications to ordinary and partial differential equations, the main question being convergence (or not) of the solutions to an equilibrium. After reviewing the basic concepts of topological dynamics and the definition of gradient-like systems on a metric space, the authors present a comprehensive exposition of stability theory relying on the so-called linearization method. For the convergence problem itself, when the set of equilibria is infinite, the only general results that do not require very special features of the non-linearities are presently consequences of a gradient inequality discovered by S. Lojasiewicz. The application of this inequality jointly with the so-called Liapunov-Schmidt reduction requires a rigorous exposition of Semi-Fredholm operator theory and the theory of real analytic maps on infinite dimensional Banach spaces, which cannot be found anywhere in a readily applicable form. The applications covered in this short text are the simplest, but more complicated cases are mentioned in the final chapter, together with references to the corresponding specialized papers.
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650 0 $a Convergence. $3 527850
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