Abstract / Description of output
Motivated by a Möbius invariant subdivision scheme for polygons, we study a curvature notion for discrete curves where the cross-ratio plays an important role in all our key definitions. Using a particular Möbius invariant point-insertion-rule, comparable to the classical four-point-scheme, we construct circles along discrete curves. Asymptotic analysis shows that these circles defined on a sampled curve converge to the smooth curvature circles as the sampling density increases. We express our discrete torsion for space curves, which is not a Möbius invariant notion, using the cross-ratio and show its asymptotic behavior in analogy to the curvature.
Original language | English |
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Pages (from-to) | 1935-1960 |
Number of pages | 26 |
Journal | Annali di Matematica Pura ed Applicata |
Volume | 200 |
Issue number | 5 |
Early online date | 21 Jan 2021 |
DOIs | |
Publication status | Published - 1 Oct 2021 |
Keywords / Materials (for Non-textual outputs)
- Discrete curvature
- Discrete torsion
- Asymptotic analysis