Catching jumps of metric-valued mappings with Lipschitz functions

Abstract

It follows from recent results of V. Bakhtin, R. Oleinik, and the second named author that, given a metric space X, a continuous map γ [a,b] X is a map of bounded variation if and only if f γ is a function of bounded variation for every Lipschitz function f R. In this note, we show that the continuity assumption is of crucial importance: for many interesting examples of metric spaces there are no analogs of that characterization without the continuity assumption on γ. The interesting examples are: 2, infinite metric trees, and Laakso-type spaces. However, for ultrametric spaces the said characterization holds without any continuity assumptions.

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