Dedicated to R. Stanley on the occasion of his 60th birthday (Stanley Festschrift)International audienceComparing two expressions of the Tutte polynomial of an ordered oriented matroid yields a remarkable numerical relation between the numbers of reorientations and bases with given activities. A natural activity preserving reorientation-to-basis mapping compatible with this relation is described in a series of papers by the present authors. This mapping, equivalent to a bijection between regions and no broken circuit subsets, provides a bijective version of several enumerative results due to Stanley, Winder, Zaslavsky, and Las Vergnas, expressing the number of acyclic orientations in graphs, or the number of regions in real arrangements of ...
International audienceThe first author introduced the circuit–cocircuit reversal system of an orient...
We consider that two orientations of a regular matroid are equivalent if one can be obtained from th...
AbstractThe notion of activities with respect to spanning trees in graphs was introduced by W.T. Tut...
AbstractThe present paper is the first in a series of four dealing with a mapping, introduced by the...
International audienceIn this note, we present the main results of a series of forthcoming papers, d...
In this note, we present the main results of a series of forthcoming papers, dealing with bi-jective...
AbstractA comparison of two expressions of the Tutte polynomial of an ordered oriented matroid, one ...
We show that the 4-variable generating function of certain orientation related parameters of an orde...
International audienceThe fully optimal basis of a bounded acyclic oriented matroid on a linearly or...
International audienceWe introduce the active partition of the ground set of an oriented matroid per...
International audienceThe active bijection forms a package of results studied by the authors in a se...
AbstractWe investigate several hyperplane arrangements that can be viewed as deformations of Coxeter...
Thesis (Ph. D.)--Massachusetts Institute of Technology, Dept. of Mathematics, 1996.Includes bibliogr...
Matroids are combinatorial objects that capture abstractly the essence of dependence. The Tutte poly...
The first author introduced the circuit–cocircuit reversal system of an oriented matroid, and showed...
International audienceThe first author introduced the circuit–cocircuit reversal system of an orient...
We consider that two orientations of a regular matroid are equivalent if one can be obtained from th...
AbstractThe notion of activities with respect to spanning trees in graphs was introduced by W.T. Tut...
AbstractThe present paper is the first in a series of four dealing with a mapping, introduced by the...
International audienceIn this note, we present the main results of a series of forthcoming papers, d...
In this note, we present the main results of a series of forthcoming papers, dealing with bi-jective...
AbstractA comparison of two expressions of the Tutte polynomial of an ordered oriented matroid, one ...
We show that the 4-variable generating function of certain orientation related parameters of an orde...
International audienceThe fully optimal basis of a bounded acyclic oriented matroid on a linearly or...
International audienceWe introduce the active partition of the ground set of an oriented matroid per...
International audienceThe active bijection forms a package of results studied by the authors in a se...
AbstractWe investigate several hyperplane arrangements that can be viewed as deformations of Coxeter...
Thesis (Ph. D.)--Massachusetts Institute of Technology, Dept. of Mathematics, 1996.Includes bibliogr...
Matroids are combinatorial objects that capture abstractly the essence of dependence. The Tutte poly...
The first author introduced the circuit–cocircuit reversal system of an oriented matroid, and showed...
International audienceThe first author introduced the circuit–cocircuit reversal system of an orient...
We consider that two orientations of a regular matroid are equivalent if one can be obtained from th...
AbstractThe notion of activities with respect to spanning trees in graphs was introduced by W.T. Tut...