Convexity and well-posed problems
β R Lucchetti
π Library
π
2006
π Springer
π English
β¦ LIBER β¦
π
Convexity and well-posed problems
β Scribed by Lucchetti R.
- Publisher
- Springer
- Year
- 2005
- Tongue
- English
- Leaves
- 321
- Series
- CMS Books in Mathematics
- Category
- Library
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No coin nor oath required. For personal study only.
β¦ Synopsis
This book deals with the study of convex functions and of their behavior from the point of view of stability with respect to perturbations. Convex functions are considered from the modern point of view that underlines the geometrical aspect: thus a function is defined as convex whenever its graph is a convex set. A primary goal of this book is to study the problems of stability and well-posedness, in the convex case. Stability means that the basic parameters of a minimum problem do not vary much if we slightly change the initial data. On the other hand, well-posedness means that points with values close to the value of the problem must be close to actual solutions. In studying this, one is naturally led to consider perturbations of functions and of sets. While there exist numerous classic texts on the issue of stability, there only exists one book on hypertopologies [Beer 1993]. The current book differs from Beerβs in that it contains a much more condensed explication of hypertopologies and is intended to help those not familiar with hypertopologies learn how to use them in the context of optimization problems.
π SIMILAR VOLUMES
Convexity and Well-Posed Problems
β Roberto Lucchetti (auth.)
π Library
π
2006
π Springer-Verlag New York
π English
<p><P>Intended for graduate students especially in mathematics, physics, and</P><P>economics, this book deals with the study of convex functions and of</P><P>their behavior from the point of view of stability with respect to</P><P>perturbations. The primary goal is the study of the problems of</P><P
Convexity and Well-Posed Problems
β Roberto Lucchetti
π Library
π
2005
π Springer
π English
"In this book the author focuses on the study of convex functions and their properties under perturbations of data. In particular, he illustrates the ideas of stability and well-posedness and the connections between them.
Convexity and Well-Posed Problems (CMS B
β Roberto Lucchetti
π Library
π
2005
π Springer
π English
This book deals with the study of convex functions and of their behavior from the point of view of stability with respect to perturbations. Convex functions are considered from the modern point of view that underlines the geometrical aspect: thus a function is defined as convex whenever its graph is
Symposium on Non-Well-Posed Problems and
β R. J. Knops
π Library
π
1973
π Springer
π English
Well-Posed Optimization Problems
β Asen L. Dontchev, Tullio Zolezzi (auth.)
π Library
π
1993
π Springer-Verlag Berlin Heidelberg
π English
<p>This book presents in a unified way the mathematical theory of well-posedness in optimization. The basic concepts of well-posedness and the links among them are studied, in particular Hadamard and Tykhonov well-posedness. Abstract optimization problems as well as applications to optimal control,