Curves in Banach spaces which allow a $C^{1,\rm BV}$ parametrization or a parametrization with finite convexity

Duda, Jakub; Zajíček, Luděk

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Curves in Banach spaces which allow a $C^{1,\rm BV}$ parametrization or a parametrization with finite convexity. (English). Czechoslovak Mathematical Journal, vol. 63 (2013), issue 4, pp. 1057-1085

MSC: 26A51, 26E20, 53A04 | MR 3165515 | Zbl 06373962 | DOI: 10.1007/s10587-013-0072-7

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Keywords:
curve in Banach spaces; $C^{1,\rm BV}$ parametrization; parametrization with bounded convexity

Summary:
We give a complete characterization of those $f\colon [0,1] \to X$ (where $X$ is a Banach space) which allow an equivalent $C^{1,\rm BV}$ parametrization (i.e., a $C^1$ parametrization whose derivative has bounded variation) or a parametrization with bounded convexity. Our results are new also for $X= \mathbb R^n$. We present examples which show applicability of our characterizations. For example, we show that the $C^{1,\rm BV}$ and $C^2$ parametrization problems are equivalent for $X=\mathbb R$ but are not equivalent for $X = \mathbb R^2$.

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