Detachable pairs in 3-connected matroids and simple 3-connected graphs

Abstract

Let M be a 3-connected matroid. A pair \e,f\ in M is detachable if M e f or M / e / f is 3-connected. Williams (2015) proved that if M has at least 13 elements, then at least one of the following holds: M has a detachable pair, M has a 3-element circuit or cocircuit, or M is a spike. We address the case where M has a 3-element circuit or cocircuit, to obtain a characterisation of when a matroid with at least 13 elements has a detachable pair. As a consequence, we characterise when a simple 3-connected graph G with |E(G)| 13 has a pair of edges \e,f\ such that G/e/f or G e f is simple and 3-connected.