Optimization on Metric and Normed Spaces
"Optimization on Metric and Normed Spaces" is devoted to the recent progress in optimization on Banach spaces and complete metric spaces. Optimization problems are usually considered on metric spaces satisfying certain compactness assumptions which guaran
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Springer Optimization and Its Applications VOLUME 44 Managing Editor Panos M. Pardalos (University of Florida) Editor—Combinatorial Optimization Ding-Zhu Du (University of Texas at Dallas) Advisory Board J. Birge (University of Chicago) C.A. Floudas (Princeton University) F. Giannessi (University of Pisa) H.D. Sherali (Virginia Polytechnic and State University) T. Terlaky (McMaster University) Y. Ye (Stanford University)
Aims and Scope Optimization has been expanding in all directions at an astonishing rate during the last few decades. New algorithmic and theoretical techniques have been developed, the diffusion into other disciplines has proceeded at a rapid pace, and our knowledge of all aspects of the field has grown even more profound. At the same time, one of the most striking trends in optimization is the constantly increasing emphasis on the interdisciplinary nature of the field. Optimization has been a basic tool in all areas of applied mathematics, engineering, medicine, economics and other sciences. The Springer Optimization and Its Applications series publishes undergraduate and graduate textbooks, monographs and state-of-the-art expository works that focus on algorithms for solving optimization problems and also study applications involving such problems. Some of the topics covered include nonlinear optimization (convex and nonconvex), network flow problems, stochastic optimization, optimal control, discrete optimization, multiobjective programming, description of software packages, approximation techniques and heuristic approaches.
For other titles published in this series, go to www.springer.com/series/7393
OPTIMIZATION ON METRIC AND NORMED SPACES
By ALEXANDER J. ZASLAVSKI Technion - Israel Institute of Technology Israel
Alexander J. Zaslavski Department of Mathematics Technion - Israel Institute of Technology 32000 Haifa Israel [email protected]
ISSN 1931-6828 ISBN 978-0-387-88620-6 e-ISBN 978-0-387-88621-3 DOI 10.1007/978-0-387-88621-3 Springer New York Dordrecht Heidelberg London Library of Congress Control Number: 2010932129 Mathematics Subject Classification (2010): 46Bxx, 46N10, 54E52
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