The improved and expanded second edition contains expositions of some major results which have been obtained in the years since the 1st edition. Theaffirmative answer by Preiss of the decades old question of whether a Banachspace with an equivalent Gateaux differentiable norm is a weak Asplund space. The startlingly simple proof by Simons of Rockafellar's fundamental maximal monotonicity theorem for subdifferentials of convex functions. The exciting new version of the useful Borwein-Preiss smooth variational principle due to Godefroy, Deville and Zizler. The material is accessible to students who have had a course in Functional Analysis; indeed, the first edition has been used in numerous graduate seminars. Starting with convex functions on the line, it leads to interconnected topics in convexity, differentiability and subdifferentiability of convex functions in Banach spaces, generic continuity of monotone operators, geometry of Banach spaces and the Radon-Nikodym property, convex analysis, variational principles and perturbed optimization. While much of this is classical, streamlined proofs found more recently are given in many instances. There are numerous exercises, many of which form an integral part of the exposition.
Author(s): Robert R. Phelps (auth.)
Series: Lecture Notes in Mathematics 1364
Edition: 2nd
Publisher: Springer Berlin Heidelberg
Year: 1989
Language: English
Pages: 126
Tags: Analysis
Front Matter....Pages I-IX
Convex functions on real Banach spaces....Pages 1-16
Monotone operators, subdifferentials and Asplund spaces....Pages 17-39
Lower semicontinuous convex functions....Pages 40-63
A smooth variational principle and more about Asplund spaces....Pages 64-71
Asplund spaces, the Radon-Nikodym property and optimization....Pages 72-89
Gateaux differentiability spaces....Pages 90-96
A generalization of monotone operators: Usco maps....Pages 97-103
Notes and Remarks....Pages 104-107
Back Matter....Pages 108-118