Subdivisions of maximal 3-degenerate graphs of order d+1 in graphs of minimum degree d

Abstract

We prove that every graph of minimum degree at least d 1 contains a subdivision of some maximal 3-degenerate graph of order d+1. This generalizes the classic results of Dirac (d=3) and Pelik\'an (d=4). We conjecture that for any planar maximal 3-degenerate graph H of order d+1 and any graph G of minimum degree at least d, G contains a subdivision of H. We verify this in the case H is P63 and P73