Non-Separating Cocircuits and Graphicness in Matroids

Abstract

Let M be a 3-connected binary matroid and let Y(M) be the set of elements of M avoiding at least r(M)+1 non-separating cocircuits of M. Lemos proved that M is non-graphic if and only if Y(M)≠. We generalize this result when by establishing that Y(M) is very large when M is non-graphic and M has no M(K3,3"')-minor if M is regular. More precisely that |E(M)-Y(M)| 1 in this case. We conjecture that when M is a regular matroid with an M(K3,3)-minor, then rM(E(M)-Y(M)) 2. The proof of such conjecture is reduced to a computational verification.