2012
A new semidefinite programming hierarchy for cycles in binary matroids and cuts in graphs
Publication
Publication
Mathematical Programming , Volume 112 - Issue 1-2 p. 203- 225
Abstract. The theta bodies of a polynomial ideal are a series of semidefinite programming relaxations of the convex hull of the real variety of the ideal. In this paper we construct the theta bodies of the vanishing
ideal of cycles in a binary matroid. Applied to cuts in graphs, this yields a new hierarchy of semidefinite programming relaxations of the cut polytope of the graph. If the binary matroid avoids certain minors
we can characterize when the first theta body in the hierarchy equals the cycle polytope of the matroid. Specialized to cuts in graphs, this result solves a problem posed by Lov´asz.
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Springer | |
Mathematical Programming | |
Organisation | Networks and Optimization |
Gouveia, J., Laurent, M., Parrilo, P., & Thomas, R. (2012). A new semidefinite programming hierarchy for cycles in binary matroids and cuts in graphs. Mathematical Programming, 112(1-2), 203–225. |