A note on Oct1+-free graphs and Oct2+-free graphs

Abstract

Let Oct1+ and Oct2+ be the planar and non-planar graphs that obtained from the Octahedron by 3-splitting a vertex respectively. For Oct1+, we prove that a 4-connected graph is Oct1+-free if and only if it is C62, C2k+12 (k ≥ 2) or it is obtained from C52 by repeatedly 4-splitting vertices. We also show that a planar graph is Oct1+-free if and only if it is constructed by repeatedly taking 0-, 1-, 2-sums starting from \K1, K2 ,K3\ K \Oct,L5 \, where K is the set of graphs obtained by repeatedly taking the special 3-sums of K4. For Oct2+, we prove that a 4-connected graph is Oct2+-free if and only if it is planar, C2k+12 (k ≥ 2), L(K3,3) or it is obtained from C52 by repeatedly 4-splitting vertices.