New Bounds on the Local and Global Edge-length Ratio of Planar Graphs

Abstract

The local edge-length ratio of a planar straight-line drawing is the largest ratio between the lengths of any pair of edges of that share a common vertex. The global edge-length ratio of is the largest ratio between the lengths of any pair of edges of . The local (global) edge-length ratio of a planar graph is the infimum over all local (global) edge-length ratios of its planar straight-line drawings. We show that there exist planar graphs with n vertices whose local edge-length ratio is (n). We then show a technique to establish upper bounds on the global (and hence local) edge-length ratio of planar graphs and~apply~it to Halin graphs and to other families of graphs having outerplanarity two.

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