Excluded minors are almost fragile II: essential elements

Abstract

Let M be an excluded minor for the class of P-representable matroids for some partial field P, let N be a 3-connected strong P-stabilizer that is non-binary, and suppose M has a pair of elements \a,b\ such that M a,b is 3-connected with an N-minor. Suppose also that |E(M)| ≥ |E(N)|+11 and M a,b is not N-fragile. In the prequel to this paper, we proved that M a,b is at most five elements away from an N-fragile minor. An element e in a matroid M' is N-essential if neither M'/e nor M' e has an N-minor. In this paper, we prove that, under mild assumptions, M a,b is one element away from a minor having at least r(M)-2 elements that are N-essential.