Saturated Partial Embeddings of Planar Graphs

Abstract

In this work, we study how far one can deviate from optimal behavior when embedding a planar graph. For a planar graph G, we say that a plane subgraph H⊂eq G is a plane-saturated subgraph if adding any edge (possibly with new vertices) to H would either violate planarity or make the resulting graph no longer a subgraph of G. For a planar graph G, we define the plane-saturation ratio, (G), as the minimum value of e(H)e(G) for a plane-saturated subgraph H of G and investigate how small (G) can be. While there exist planar graphs where (G) is arbitrarily close to 0, we show that for all twin-free planar graphs, (G)>1/16, and that there exist twin-free planar graphs where (G) is arbitrarily close to 1/16. In fact, we study a broader category of planar graphs, focusing on classes characterized by a bounded number of degree 1 and degree 2 twin vertices. We offer solutions for some instances of bounds while positing conjectures for the remaining ones.