Continuity of Magnitude at Skew Finite Subsets of 1N
Abstract
Magnitude is an isometric invariant of metric spaces introduced by Leinster. Although magnitude is nowhere continuous on the Gromov-Hausdorff space of finite metric spaces, continuity results are possible if we restrict the ambient space. In this paper, we focus on 1N and prove that magnitude is continuous at every skew finite subset of 1N, that is, at every finite set whose coordinate projections are injective. For such sets, we analyze cubical thickenings and derive an explicit formula for their weight measures. This yields a formula for the magnitude of these thickenings, which we use to prove that their magnitude converges to that of the underlying finite set. Since skew finite subsets of 1N form an open and dense subset of the space of all finite subsets, magnitude is continuous on an open dense subset of the space of finite subsets of 1N.
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