Lower Bounding the Gromov--Hausdorff distance in Metric Graphs

Abstract

Let G be a finite, connected metric graph and let X⊂eq G be a subset. If X is sufficiently dense in G, we show that the Gromov--Hausdorff distance matches the Hausdorff distance, namely d(G,X)=d(G,X). When the metric graph is the circle G=S1 with circumference 2π, a recent study established the equality d(S1,X)=d(S1,X) whenever d(S1,X)<π6. Our results relax this hypothesis to d(S1,X)<π3, and furthermore, we show that the constant π3 is the best possible. We lower bound the Gromov--Hausdorff distance d(G,X) by the Hausdorff distance d(G,X) via a simple topological obstruction: the existence of a possibly discontinuous function f G X with too small distortion contradicts the connectedness of G.

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