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hbghlyj
Posted at 2023-2-6 20:23:06
Last edited by hbghlyj at 2023-2-6 22:08:00EoM
A rectifiable curve is a curve having finite length (cf. Line (curve)). More precisely, consider a metric space $(X,d)$ and a continuous function $γ:[0,1]→X$. $γ$ is a parametrization of a rectifiable curve if there is an homeomorphism $φ:[0,1]→[0,1]$ such that the map $γ∘φ$ is Lipschitz.
Theorem 1 A set $E⊂\mathbb R^n$ is the image of a rectifiable curve if and only if it is compact, connected and it has finite Hausdorff 1-dimensional measure $\mathcal H^1$. |
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![qhINb[1].jpg](data/attachment/forum/202302/06/132455ciqelob5qz6zzxbz.jpg "qhINb[1].jpg")
