The total absolute curvature of closed curves with singularities
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In this paper, we give a generalization of Fenchel's theorem for closed curves as frontals in Euclidean space $\mathbb{R}^n$. We prove that, for a non-co-orientable closed frontal in $\mathbb{R}^n$, its total absolute curvature is greater than or equal to $\pi$. It is equal to $\pi$ if and only if the curve is a planar locally $L$-convex closed frontal whose rotation index is $1/2$ or $-1/2$. Furthermore, if the equality holds and if every singular point is a cusp, then the number $N$ of cusps is an odd integer greater than or equal to $3$, and $N=3$ holds if and only if the curve is simple.
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The total absolute curvature of submanifolds with singularities
Generalizes Chern-Lashof theorem to admissible compact frontals, proving total absolute curvature >= sum of Betti numbers, with equality (total=2, first-kind singularities) implying image is closed convex domain in af...
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