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EJC
2006
2006
The positive Bergman complex of an oriented matroid
We study the positive Bergman complex B+ (M) of an oriented matroid M, which is a certain subcomplex of the Bergman complex B(M) of the underlying unoriented matroid M. The positive Bergman complex is defined so that given a linear ideal I with associated oriented matroid MI , the positive tropical variety associated to I is equal to the fan over B+ (MI ). Our main result is that a certain "fine" subdivision of B+ (M) is a geometric realization of the order complex of the proper part of the Las Vergnas face lattice of M. It follows that B+ (M) is homeomorphic to a sphere. For the oriented matroid of the complete graph Kn, we show that the face poset of the "coarse" subdivision of B+ (Kn) is dual to the face poset of the associahedron An-2, and we give a formula for the number of fine cells within a coarse cell.
Real-time Traffic| Added | 12 Dec 2010 |
| Updated | 12 Dec 2010 |
| Type | Journal |
| Year | 2006 |
| Where | EJC |
| Authors | Federico Ardila, Caroline J. Klivans, Lauren Williams |
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