Well-quasi-order of plane minors and an application to link diagrams

Abstract

A plane graph H is a plane minor of a plane graph G if there is a sequence of vertex and edge deletions, and edge contractions performed on the plane, that takes G to H. Motivated by knot theory problems, it has been asked if the plane minor relation is a well-quasi-order. We settle this in the affirmative. We also prove an additional application to knot theory. If L is a link and D is a link diagram, write D L if there is a sequence of crossing exchanges and smoothings that takes D to a diagram of L. We show that, for each fixed link L, there is a polynomial-time algorithm that takes as input a link diagram D and answers whether or not D L.