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Article Dans Une Revue Mathematical Programming Année : 2010

Computing deep facet-defining disjunctive cuts for mixed-integer programming

Résumé

The problem of separation is to find an affine hyperplane, or "cut", that lies between the origin O and a given closed convex set Q in a Euclidean space. We study cuts which are deep in a well-defined geometrical sense, and facet-defining. The cases when the deepest cut is decomposable as a combination of facet-defining cuts are characterized using the reverse polar set. When Q is a disjunctive polyhedron, a description of the reverse polar, linked to the so-called cut generating linear program of lift-and-project techniques, is given. A successive projections algorithm onto the reverse polar is proposed that computes the decomposition of the deepest cut into facet-defining cuts. Illustrative numerical experiments show how these cuts compare with the deepest cut, and with the most violated cut.

Dates et versions

inria-00396289 , version 1 (17-06-2009)

Identifiants

Citer

Florent Cadoux. Computing deep facet-defining disjunctive cuts for mixed-integer programming. Mathematical Programming, 2010, 122 (2), pp.197-223. ⟨10.1007/s10107-008-0245-6⟩. ⟨inria-00396289⟩
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