The Kelmans-Seymour conjecture II: 2-vertices in K4-

Abstract

We use K4- to denote the graph obtained from K4 by removing an edge, and use TK5 to denote a subdivision of K5. Let G be a 5-connected nonplanar graph and \x1,x2,y1,y2\⊂eq V(G) such that G[\x1,x2, y1,y2\] K4- with y1y2 E(G). Let w1,w2,w3∈ N(y2)-\x1,x2\ be distinct. We show that G contains a TK5 in which y2 is not a branch vertex, or G-y2 contains K4-, or G has a special 5-separation, or G-\y2v:v \w1,w2,w3,x1,x2\\ contains TK5.