On the Holt-Klee Property for Oriented Matroid Programming
Abstract
The Holt-Klee theorem says that the graph of a d-polytope, with edges oriented by a linear function on P that is not constant on any edge, admits d independent monotone paths from the source to the sink. We prove that the digraphs obtained from oriented matroid programs of rank d+1 on n+2 elements, which include those from d-polytopes with n facets, admit d independent monotone paths from source to sink if d 4. This was previously only known to hold for d 3 and n 6.
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