Semidefinite relaxations for partitioning, assignment and ordering problems

Semidefinite relaxations for partitioning, assignment and ordering problems

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Article ID: iaor20128182
Volume: 10
Issue: 4
Start Page Number: 321
End Page Number: 346
Publication Date: Dec 2012
Journal: 4OR
Authors:
Keywords: programming (semidefinite)
Abstract:

Semidefinite optimization is a strong tool in the study of NP‐hard combinatorial optimization problems. On the one hand, semidefinite optimization problems are in principle solvable in polynomial time (with fixed precision), on the other hand, their modeling power allows to naturally handle quadratic constraints. Contrary to linear optimization with the efficiency of the Simplex method, the algorithmic treatment of semidefinite problems is much more subtle and also practically quite expensive. This survey‐type article is meant as an introduction for a non‐expert to this exciting area. The basic concepts are explained on a mostly intuitive level, and pointers to advanced topics are given. We provide a variety of semidefinite optimization models on a selection of graph optimization problems and give a flavour of their practical impact.

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