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by Winfried Schirotzek

Author: Winfried Schirotzek
Subcategory: Mathematics
Language: English
Publisher: Springer; 2007 edition (July 20, 2007)
Pages: 378 pages
Category: Math and Science
Rating: 4.9
Other formats: mobi lrf azw lrf

Winfried Schirotzek (Author). This book tells the story of the development of nonsmooth analysi. .may be used for a graduate course in nonsmooth analysis or as a basic reference for a short course.

Winfried Schirotzek (Author). ISBN-13: 978-3540713326. It provides a comprehensive overvie. nd a valuable source of information on forty years of development during which the term ‘nonsmooth analysis’ itself was coined by Clarke. It is even worth reading for those who took part in this development but whose works often lack the reasoned description offered by this book.

Autoren: Schirotzek, Winfried. The presentation strictly proceeds from simple to more difficult. The presentation is rigorous, with detailed proofs.

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Are you sure you want to remove Nonsmooth Analysis (Universitext) from your list? Nonsmooth Analysis (Universitext). by Winfried Schirotzek. Published July 20, 2007 by Springer. Nonsmooth optimization.

The book treats various concepts of generalized derivatives and subdifferentials in normed spaces, their geometric counterparts (tangent and normal cones) and their application to optimization problems

The book treats various concepts of generalized derivatives and subdifferentials in normed spaces, their geometric counterparts (tangent and normal cones) and their application to optimization problems. It starts with the subdifferential of convex analysis, passes to corresponding concepts for locally Lipschitz continuous functions and finally presents subdifferentials for general lower semicontinuous functions.

Главная Nonsmooth Analysis. The book treats various concepts of generalized derivatives and subdifferentials in normed spaces, their geometric counterparts (tangent and normal cones) and their application to optimization problems. It starts with the subdifferential of convex analysis, passes to corresponding concepts for locally Lipschitz continuous functions and finally presents subdifferentials for general lower semicontinuous functions

Nonsmooth analysis, Winfried Schirotzek. PUBLISHER: Berlin ; New York : Springer, c2007. SERIES: Universitext. CALL NUMBER: QA 40.

Nonsmooth analysis, Winfried Schirotzek. TITLE: Quantum probability and spectral analysis of graphs, Akihito Hora, Nobuaki Obata ; with a foreword by Luigi Accardi.

Nonsmooth analysis (Universitext), 2007 Universitext Series. Author: Schirotzek Winfried. This book treats various concepts of generalized derivatives and subdifferentials in normed spaces, their geometric counterparts and their application to optimization problems. Subject for Nonsmooth analysis (Universitext): Analysis (equations, numerical analysis, numeric analysis). It starts with the subdifferential of convex analysis, passes to corresponding concepts for locally Lipschitz continuous functions and then presents subdifferentials for general lower semicontinuous functions.

Nonsmooth Analysis (Universitext). ISBN 9783540713326 (978-3-540-71332-6) Softcover, Springer Berlin Heidelberg, 2007. Find signed collectible books: 'Nonsmooth Analysis (Universitext)'. Founded in 1997, BookFinder

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Download Free eBook:Nonsmooth Analysis - Free chm, pdf ebooks download. All basic tools are presented where they are needed; this concerns separation theorems, variational and extremal principles as well as relevant parts of multifunction theory.

This book treats various concepts of generalized derivatives and subdifferentials in normed spaces, their geometric counterparts and their application to optimization problems. It starts with the subdifferential of convex analysis, passes to corresponding concepts for locally Lipschitz continuous functions and then presents subdifferentials for general lower semicontinuous functions. All basic tools are presented where they are needed: this concerns separation theorems, variational and extremal principles as well as relevant parts of multifunction theory. Each chapter ends with bibliographic notes and exercises.