A spatial version of Tutte's conflict graph

Abstract

Tutte showed that a graph G is planar if and only if the conflict graph associated to every cycle of G is bipartite. We define a (not necessarily unique) signed conflict graph associated to a maximally planar subgraph of a nonplanar graph such that if G has a flat embedding, every possible conflict graph associated to every maximally planar subgraph of G is balanced. In doing this, we show that for every graph G with flat embedding, and a planar subgraph P of G, P lies on a sphere that intersects G only in P. We conjecture that G is intrinsically linked if and only if every maximal planar subgraph of G has every possible conflict graph unbalanced.

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