A new approach to the stable set problem based on ellipsoids

Giandomenico, M and Letchford, A N and Rossi, F and Smriglio, S (2011) A new approach to the stable set problem based on ellipsoids. Working Paper. The Department of Management Science, Lancaster University.

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Abstract

We present a new exact approach to the stable set problem, which avoids the pitfalls of existing approaches based on linear and semidefinite programming. The main idea is to construct an ellipsoid which contains the stable set polytope, in such a way that the upper bound obtained by optimising over the ellipsoid is equal to the Lovasz theta number. This ellipsoid can then be used to construct useful convex programming relaxations of the stable set problem or, more interestingly, to derive cutting planes. These cutting planes turn out to be remarkably strong and easy to generate.

Item Type:
Monograph (Working Paper)
Additional Information:
This was eventually published as: M. Giandomenico, A.N. Letchford, F. Rossi & S. Smriglio (2011) An new approach to the stable set problem based on ellipsoids. In O. Günlük & G.J. Woeginger (eds.) Integer Programming and Combinatorial Optimization XV. Lecture Notes in Computer Science, vol. 6655. Heidelberg: Springer.
Uncontrolled Keywords:
/dk/atira/pure/subjectarea/aacsb/disciplinebasedresearch
Subjects:
?? STABLE SET PROBLEMSEMIDEFINITE PROGRAMMINGCONVEX QUADRATIC PROGRAMMINGCUTTING PLANES.MANAGEMENT SCIENCEDISCIPLINE-BASED RESEARCH ??
ID Code:
49042
Deposited By:
Deposited On:
11 Jul 2011 21:30
Refereed?:
No
Published?:
Published
Last Modified:
19 Sep 2023 03:49