Title
Convex Analysis And Variational Problems (Classics In Applied Mathematics, Series Number 28),New
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No One Working In Duality Should Be Without A Copy Of Convex Analysis And Variational Problems. This Book Contains Different Developments Of Infinite Dimensional Convex Programming In The Context Of Convex Analysis, Including Duality, Minmax And Lagrangians, And Convexification Of Nonconvex Optimization Problems In The Calculus Of Variations (Infinite Dimension). It Also Includes The Theory Of Convex Duality Applied To Partial Differential Equations; No Other Reference Presents This In A Systematic Way. The Minmax Theorems Contained In This Book Have Many Useful Applications, In Particular The Robust Control Of Partial Differential Equations In Finite Time Horizon. First Published In English In 1976, This Siam Classics In Applied Mathematics Edition Contains The Original Text Along With A New Preface And Some Additional References.
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- Q: How many pages does this book have? A: This book contains four hundred sixteen pages. It provides an in-depth exploration of convex analysis and variational problems.
- Q: What is the binding type of this book? A: This book is available in paperback binding. Paperback editions are flexible and lightweight, making them easy to handle.
- Q: What are the dimensions of the book? A: The book measures six and a half inches in length, one inch in width, and nine and a quarter inches in height. These dimensions make it a manageable size for reading and storage.
- Q: What is the main subject of this book? A: The main subject of this book is convex analysis and variational problems. It discusses infinite dimensional convex programming and its applications.
- Q: Who is the author of this book? A: The author of this book is Ivar Ekeland. He is well-regarded in the field of applied mathematics.
- Q: Is this book suitable for beginners? A: Yes, this book is suitable for individuals with a foundational understanding of mathematics. However, some prior knowledge of convex analysis may be beneficial.
- Q: How is this book useful for studying duality? A: This book systematically presents the theory of convex duality. It provides essential insights for anyone studying duality in optimization problems.
- Q: Can this book help with understanding partial differential equations? A: Yes, it includes the application of convex duality to partial differential equations. This aspect is useful for researchers and practitioners in mathematical sciences.
- Q: What type of reader would benefit from this book? A: Researchers and students in applied mathematics or optimization would greatly benefit from this book. Its advanced topics cater to a specialized audience.
- Q: Does this book contain any new preface? A: Yes, this edition includes a new preface. It also features additional references to enhance the reader's understanding.
- Q: What condition is the used book in? A: The used book is described as being in good condition. This indicates it has been well-maintained and is still suitable for reading.
- Q: Is this book part of a series? A: Yes, this book is part of the 'Classics in Applied Mathematics' series. It is recognized as Series Number twenty-eight.
- Q: How does this book address nonconvex optimization problems? A: This book discusses convexification of nonconvex optimization problems. It provides methods to approach complex optimization challenges.
- Q: What year was this book first published in English? A: This book was first published in English in nineteen seventy-six. It has since become a classic reference in the field.
- Q: Who is the publisher of this book? A: The publisher of this book is the Society for Industrial and Applied Mathematics. This organization is known for its contributions to applied mathematics literature.
- Q: Are there any specific applications mentioned in the book? A: Yes, the book includes applications in robust control of partial differential equations. These applications are relevant for practical problem-solving in mathematics.