The speed measure and absolute continuity for curves in metric spaces
Abstract
We define the speed measure for mappings γ:I X from an interval to a metric space that are locally of bounded variation. We characterize continuity and absolute continuity of γ in terms of and identify the Radon-Nikod\'ym derivative of with respect to Lebesgue measure as the metric speed of γ. In doing so we prove an extension of the Banach-Zaretsky theorem.
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