Polyhedral and semidefinite programming methods in combinatorial optimization
Material type:
TextSeries: Fields Institute monographs, 27Publication details: Providence, Rhode Island American Mathematical Society 2010Description: x, 219 pISBN: - 9780821833520
- 519.7 T8P6
| Item type | Current library | Item location | Collection | Shelving location | Call number | Status | Date due | Barcode | |
|---|---|---|---|---|---|---|---|---|---|
| Books | Vikram Sarabhai Library | Rack 33-A / Slot 1683 (2nd Floor, East Wing) | Non-fiction | General Stacks | 519.7 T8P6 (Browse shelf(Opens below)) | Available | 177163 |
The Fields Institute for research in mathematical sciences
Includes bibliographical references (p. 203-216) and index
Since the early 1960s, polyhedral methods have played a central role in both the theory and practice of combinatorial optimization. Since the early 1990s, a new technique, semidefinite programming, has been increasingly applied to some combinatorial optimization problems. The semidefinite programming problem is the problem of optimizing a linear function of matrix variables, subject to finitely many linear inequalities and the positive semidefiniteness condition on some of the matrix variables. On certain problems, such as maximum cut, maximum satisfiability, maximum stable set and geometric representations of graphs, semidefinite programming techniques yield important new results. This monograph provides the necessary background to work with semidefinite optimization techniques, usually by drawing parallels to the development of polyhedral techniques and with a special focus on combinatorial optimization, graph theory and lift-and-project methods. It allows the reader to rigorously develop the necessary knowledge, tools and skills to work in the area that is at the intersection of combinatorial optimization and semidefinite optimization. (http://www.ams.org/bookstore-getitem/item=FIM-27)
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