Fundamentals of Convex Analysis

1. Front Matter

   Pages I-X

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2. Introduction: Notation, Elementary Results

   • Jean-Baptiste Hiriart-Urruty, Claude Lemaréchal

   Pages 1-17

3. Convex Sets

   • Jean-Baptiste Hiriart-Urruty, Claude Lemaréchal

   Pages 19-72

4. Convex Functions

   • Jean-Baptiste Hiriart-Urruty, Claude Lemaréchal

   Pages 73-120

5. Sublinearity and Support Functions

   • Jean-Baptiste Hiriart-Urruty, Claude Lemaréchal

   Pages 121-162

6. Subdifferentials of Finite Convex Functions

   • Jean-Baptiste Hiriart-Urruty, Claude Lemaréchal

   Pages 163-208

7. Conjugacy in Convex Analysis

   • Jean-Baptiste Hiriart-Urruty, Claude Lemaréchal

   Pages 209-244

8. Back Matter

   Pages 245-259

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This book is an abridged version of our two-volume opus Convex Analysis and Minimization Algorithms [18], about which we have received very positive feedback from users, readers, lecturers ever since it was published - by Springer-Verlag in 1993. Its pedagogical qualities were particularly appreciated, in the combination with a rather advanced technical material. Now [18] hasa dual but clearly defined nature: - an introduction to the basic concepts in convex analysis, - a study of convex minimization problems (with an emphasis on numerical al- rithms), and insists on their mutual interpenetration. It is our feeling that the above basic introduction is much needed in the scientific community. This is the motivation for the present edition, our intention being to create a tool useful to teach convex anal­ ysis. We have thus extracted from [18] its "backbone" devoted to convex analysis, namely ChapsIII-VI and X. Apart from some local improvements, the present text is mostly a copy of thecorresponding chapters. The main difference is that we have deleted material deemed too advanced for an introduction, or too closely attached to numerical algorithms. Further, we have included exercises, whose degree of difficulty is suggested by 0, I or 2 stars *. Finally, the index has been considerably enriched. Just as in [18], each chapter is presented as a "lesson", in the sense of our old masters, treating of a given subject in its entirety.

• Continuity and Differentiation questions
• Convex functions and convex programs in convex geometry
• Functions of one variable
• Optimality conditions
• Numerical methods in optimal control
• Mathematical programming
• Convex analysis
• Optimization

• Département de Mathématiques, Université Paul Sabatier, Toulouse, France

  Jean-Baptiste Hiriart-Urruty

• INRIA, Rhône Alpes, ZIRST, Montbonnot, France

  Claude Lemaréchal

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