Combinatorial face enumeration in arrangements and oriented matroids

An oriented matroid lattice is a lattice arising from the span of cocircuits of an oriented matroid ordered by conformal relation. One important subclass of the o.m. lattices is the polars of face lattices of zonotopes. In this paper we show that every o.m. lattice is a (combinatorial) manifold. Thi

We investigate the combinatorial and topological properties of simplicial cells in arrangements of (pseudo)hyperplanes, using their interpretations in terms of oriented matroids. Simplicial cells have various applications in computational geometry due to the fact that for an arrangement in general p

We consider the cocircuit graph G M of an oriented matroid M, which is the 1-skeleton of the cell complex formed by the span of the cocircuits of M. As a result of Cordovil, Fukuda, and Guedes de Oliveira, the isomorphism class of M is not determined by G M , but it is determined if M is uniform and