hyperbolic plane curve; flow-geodesic curvature; flow-evolute. flow-geodesic curvature flow-geodesic curvature flow-evolute flow-evolute
We introduce a new type of curvature function and associated evolute curve for a given curve in the hyperboloid model of plane hyperbolic geometry. A special attention is devoted to the examples, particularly to a horocycle provided by the null Lorentzian rotation.
Hyperbolic plane curve flow-geodesic curvature flow-geodesic curvature flow-geodesic curvature flow-geodesic curvature flow-evolute flow-evolute flow-evolute flow-evolute
Primary Language | English |
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Subjects | Mathematical Sciences |
Journal Section | Research Article |
Authors | |
Publication Date | April 30, 2023 |
Acceptance Date | February 20, 2023 |
Published in Issue | Year 2023 |