Differential Inclusions in a Banach Space

Differential Inclusions in a Banach Space
Author :
Publisher : Springer Science & Business Media
Total Pages : 328
Release :
ISBN-10 : 0792366182
ISBN-13 : 9780792366188
Rating : 4/5 (82 Downloads)

Book Synopsis Differential Inclusions in a Banach Space by : Alexander Tolstonogov

Download or read book Differential Inclusions in a Banach Space written by Alexander Tolstonogov and published by Springer Science & Business Media. This book was released on 2000-10-31 with total page 328 pages. Available in PDF, EPUB and Kindle. Book excerpt: Preface to the English Edition The present monograph is a revised and enlarged alternative of the author's monograph [19] which was devoted to the development of a unified approach to studying differential inclusions, whose values of the right hand sides are compact, not necessarily convex subsets of a Banach space. This approach relies on ideas and methods of modem functional analysis, general topology, the theory of multi-valued mappings and continuous selectors. Although the basic content of the previous monograph has been remained the same this monograph has been partly re-organized and the author's recent results have been added. The contents of the present book are divided into five Chapters and an Appendix. The first Chapter of the J>ook has been left without changes and deals with multi-valued differential equations generated by a differential inclusion. The second Chapter has been significantly revised and extended. Here the au thor's recent results concerning extreme continuous selectors of multi-functions with decomposable values, multi-valued selectors ofmulti-functions generated by a differential inclusion, the existence of solutions of a differential inclusion, whose right hand side has different properties of semicontinuity at different points, have been included. Some of these results made it possible to simplify schemes for proofs concerning the existence of solutions of differential inclu sions with semicontinuous right hand side a.nd to obtain new results. In this Chapter the existence of solutions of different types are considered.


Differential Inclusions in a Banach Space Related Books

Differential Inclusions in a Banach Space
Language: en
Pages: 328
Authors: Alexander Tolstonogov
Categories: Mathematics
Type: BOOK - Published: 2000-10-31 - Publisher: Springer Science & Business Media

DOWNLOAD EBOOK

Preface to the English Edition The present monograph is a revised and enlarged alternative of the author's monograph [19] which was devoted to the development o
Condensing Multivalued Maps and Semilinear Differential Inclusions in Banach Spaces
Language: en
Pages: 245
Authors: Mikhail I. Kamenskii
Categories: Mathematics
Type: BOOK - Published: 2011-07-20 - Publisher: Walter de Gruyter

DOWNLOAD EBOOK

The theory of set-valued maps and of differential inclusion is developed in recent years both as a field of his own and as an approach to control theory. The bo
Differential Inclusions in a Banach Space
Language: en
Pages: 314
Authors: Alexander Tolstonogov
Categories: Mathematics
Type: BOOK - Published: 2012-12-06 - Publisher: Springer Science & Business Media

DOWNLOAD EBOOK

Preface to the English Edition The present monograph is a revised and enlarged alternative of the author's monograph [19] which was devoted to the development o
Differential Inclusions in a Banach Space
Language: en
Pages: 320
Authors: Alexander Tolstonogov
Categories:
Type: BOOK - Published: 2000-10-31 - Publisher:

DOWNLOAD EBOOK

This monograph is devoted to the development of a unified approach for studying differential inclusions in a Banach space with non-convex right-hand side, a new
Introduction to the Theory of Differential Inclusions
Language: en
Pages: 226
Authors: Georgi V. Smirnov
Categories: Mathematics
Type: BOOK - Published: 2022-02-22 - Publisher: American Mathematical Society

DOWNLOAD EBOOK

A differential inclusion is a relation of the form $dot x in F(x)$, where $F$ is a set-valued map associating any point $x in R^n$ with a set $F(x) subset R^n$.