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arxiv: 1603.03077 · v1 · pith:E36HPZ23new · submitted 2016-03-09 · 🧮 math.MG · math.CA

The Analyst's traveling salesman theorem in graph inverse limits

classification 🧮 math.MG math.CA
keywords spacesanalystinverselimitsmetricsalesmantheoremtraveling
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We prove a version of Peter Jones' Analyst's traveling salesman theorem in a class of highly non-Euclidean metric spaces introduced by Laakso and generalized by Cheeger-Kleiner. These spaces are constructed as inverse limits of metric graphs, and include examples which are doubling and have a Poincare inequality. We show that a set in one of these spaces is contained in a rectifiable curve if and only if it is quantitatively "flat" at most locations and scales, where flatness is measured with respect to so-called monotone geodesics. This provides a first examination of quantitative rectifiability within these spaces.

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