Calculus Without Derivatives
Autor Jean-Paul Penoten Limba Engleză Hardback – 9 noi 2012
In order to be self-contained, the book includes three chapters of preliminary material, each of which can be used as an independent course if needed. The first chapter deals with metric properties, variational principles, decrease principles, methods of error bounds, calmness and metric regularity. The second one presents the classical tools of differential calculus and includes a section about the calculus of variations. The third contains a clear exposition of convex analysis.
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| Springer – 13 dec 2014 | 523.10 lei 38-44 zile | |
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| Springer – 9 noi 2012 | 616.48 lei 3-5 săpt. | +42.50 lei 10-14 zile |
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Specificații
ISBN-13: 9781461445371
ISBN-10: 146144537X
Pagini: 544
Ilustrații: XX, 524 p.
Dimensiuni: 160 x 241 x 33 mm
Greutate: 0.97 kg
Ediția:2013
Editura: Springer
Locul publicării:New York, NY, United States
ISBN-10: 146144537X
Pagini: 544
Ilustrații: XX, 524 p.
Dimensiuni: 160 x 241 x 33 mm
Greutate: 0.97 kg
Ediția:2013
Editura: Springer
Locul publicării:New York, NY, United States
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Public țintă
GraduateCuprins
Preface.- 1 Metric and Topological Tools.- 2 Elements of Differential Calculus.- 3 Elements of Convex Analysis.- 4 Elementary and Viscosity Subdifferentials.- 5 Circa-Subdifferentials, Clarke Subdifferentials.- 6 Limiting Subdifferentials.- 7 Graded Subdifferentials, Ioffe Subdifferentials.- References.- Index.
Recenzii
“The book collects three different branches of analysis: differential calculus, convex analysis, and nonsmooth analysis. … What makes Penot’s work stand out is his path through the material and the clean and scholarly presentation. It is well suited for individual study or a classroom … . As preparation for the rough road ahead of us in the coming decades, it might be worth the investment.” (Russell Luke, SIAM Review, Vol. 57 (2), June, 2015)
“This very good book is an treatise on approximate calculus and justifies the author’s claim that the rules of this calculus are as important and useful as those for exact calculus. … The book is notable not only for its exposition but also for the notes at the end of each chapter explaining the historical and other relevant backgrounds of the material. There are many exercises throughout the book.” (Peter S. Bullen, Zentralblatt MATH, Vol. 1264, 2013)
“By collecting together a lot of results in nonsmooth analysis and presenting them in a coherent and accessible way, the author rendered a great service to the mathematical community. The book can be considered as an incentive for newcomers to enter this area of research … . The specialists will find also a lot of systematized information, and … the first three chapters can be used for independent graduate courses.” (S. Cobzaş¸ Studia Universitatis Babes-Bolyai, Mathematica, Vol. 58 (1), 2013)
“This very good book is an treatise on approximate calculus and justifies the author’s claim that the rules of this calculus are as important and useful as those for exact calculus. … The book is notable not only for its exposition but also for the notes at the end of each chapter explaining the historical and other relevant backgrounds of the material. There are many exercises throughout the book.” (Peter S. Bullen, Zentralblatt MATH, Vol. 1264, 2013)
“By collecting together a lot of results in nonsmooth analysis and presenting them in a coherent and accessible way, the author rendered a great service to the mathematical community. The book can be considered as an incentive for newcomers to enter this area of research … . The specialists will find also a lot of systematized information, and … the first three chapters can be used for independent graduate courses.” (S. Cobzaş¸ Studia Universitatis Babes-Bolyai, Mathematica, Vol. 58 (1), 2013)
Notă biografică
Jean-Paul Penot is an Emeritus Professor at Université Paris 6. He has taught in Paris, Pau and Canada.
Textul de pe ultima copertă
Calculus Without Derivatives expounds the foundations and recent advances in nonsmooth analysis, a powerful compound of mathematical tools that obviates the usual smoothness assumptions. This textbook also provides significant tools and methods towards applications, in particular optimization problems. Whereas most books on this subject focus on a particular theory, this text takes a general approach including all main theories.
In order to be self-contained, the book includes three chapters of preliminary material, each of which can be used as an independent course if needed. The first chapter deals with metric properties, variational principles, decrease principles, methods of error bounds, calmness and metric regularity. The second one presents the classical tools of differential calculus and includes a section about the calculus of variations. The third contains a clear exposition of convex analysis.
In order to be self-contained, the book includes three chapters of preliminary material, each of which can be used as an independent course if needed. The first chapter deals with metric properties, variational principles, decrease principles, methods of error bounds, calmness and metric regularity. The second one presents the classical tools of differential calculus and includes a section about the calculus of variations. The third contains a clear exposition of convex analysis.
Caracteristici
Includes all necessary preliminary material Introduces fundamental aspects of nonsmooth analysis that impact many applications Presents a balanced picture of the most elementary attempts to replace a derivative with a one-sided generalized derivative called a subdifferential Includes references, notes, exercises and supplements that will give the reader a thorough insight into the subject Includes supplementary material: sn.pub/extras