Saturated Partial Embeddings of Maximal Planar Graphs
Abstract
We investigate two notions of saturation for partial planar embeddings of maximal planar graphs. Let G = (V, E) be a vertex-labeled maximal planar graph on n vertices, which by definition has 3n - 6 edges. We say that a labeled plane graph H = (V, E') with E' ⊂eq E is a labeled plane-saturated subgraph of G if no edge in E E' can be added to H in a manner that preserves vertex labels, without introducing a crossing. The labeled plane-saturation ratio lpsr(G) is defined as the minimum value of e(H)e(G) over all such H. We establish almost tight bounds for lpsr(G), showing lpsr(G) ≤ n+73n-6 for n ≥ 47, and constructing a maximal planar graph G with lpsr(G) ≥ n+23n-6 for each n 5. Dropping vertex labels, a plane-saturated subgraph is defined as a plane subgraph H⊂eq G where adding any additional edge to the drawing either introduces a crossing or causes the resulting graph to no longer be a subgraph of G. The plane-saturation ratio psr(G) is defined as the minimum value of E(H)E(G) over all such H. For all sufficiently large n, we demonstrate the existence of a maximal planar graph G with psr(G) ≥ 32n - 33n - 6 = 12.
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