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2007

A counterexample to the dominating set conjecture

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A counterexample to the dominating set conjecture
Abstract The metric polytope metn is the polyhedron associated with all semimetrics on n nodes and defined by the triangle inequalities xij − xik − xjk ≤ 0 and xij + xik + xjk ≤ 2 for all triples i, j, k of {1, . . . , n}. In 1992 Monique Laurent and Svatopluk Poljak conjectured that every fractional vertex of the metric polytope is adjacent to some integral vertex. The conjecture holds for n ≤ 8 and, in particular, for the 1,550,825,600 vertices of met8. While the overwhelming majority of the known vertices of met9 satisfy the conjecture, we exhibit a fractional vertex not adjacent to any integral vertex. Keywords Dominating set conjecture · Metric polyhedra · Cut polyhedra
Antoine Deza, Gabriel Indik
Added 27 Dec 2010
Updated 27 Dec 2010
Type Journal
Year 2007
Where OL
Authors Antoine Deza, Gabriel Indik
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