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Median pretrees and functions of bounded variation

We introduce functions of bounded variation on median algebras and study some properties for median pretrees. We show that if $X$ is a compact median pretree in its shadow topology then every function $f: X \to R$ of bounded variation has the point of continuity property (Baire 1, if $X$, in addition, is metrizable). We prove a generalized version of Helly's selection theorem for a sequence of functions with total bounded variation defined on a compact metrizable median pretree $X$.

preprint2020arXivOpen access

Michael Megrelishvili

math.GN math.FA math.CA

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Michael Megrelishvili

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Median pretrees and functions of bounded variation

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