JOURNAL ARTICLE
Bézier Splines Interpolation on Stiefel and Grassmann Manifolds
Year: 2023 Journal: Journal of Computational Mathematics Vol: 42 (6)Pages: 1554-1578
Abstract
We propose a new method for smoothly interpolating a given set of data points on Grassmann and Stiefel manifolds using a generalization of the De Casteljau algorithm.To that end, we reduce interpolation problem to the classical Euclidean setting, allowing us to directly leverage the extensive toolbox of spline interpolation.The interpolated curve enjoy a number of nice properties: The solution exists and is optimal in many common situations.For applications, the structures with respect to chosen Riemannian metrics are detailed resulting in additional computational advantages.
Keywords:
Mathematics Stiefel manifold Generalization Leverage (statistics) Interpolation (computer graphics) Euclidean geometry Applied mathematics Algorithm Spline interpolation Mathematical optimization Algebra over a field Computer science Pure mathematics Mathematical analysis Geometry Artificial intelligence Bilinear interpolation Motion (physics)
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Topics
Advanced Numerical Analysis Techniques
Physical Sciences → Engineering → Computational Mechanics
Advanced Image Processing Techniques
Physical Sciences → Computer Science → Computer Vision and Pattern Recognition
Image and Signal Denoising Methods
Physical Sciences → Computer Science → Computer Vision and Pattern Recognition
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