论文信息 - Bézier Curves and C^2 C 2 Interpolation in Riemannian Symmetric Spaces

Bézier Curves and C^2 C 2 Interpolation in Riemannian Symmetric Spaces

We consider the problem of interpolating a finite set of observations at given time instant. In this paper, we introduce a new method to compute the optimal intermediate control points that define a \(C^{2}\) interpolating Bezier curve. We prove this concept for interpolating data points belonging to a Riemannian symmetric spaces. The main property of the proposed method is that the control points minimize the mean square acceleration. Moreover, potential applications of fitting smooth paths on Riemannian manifold include applications in robotics, animations, graphics, and medical studies.

Chafik Samir | Ines Adouani

[1] John C. Hart,et al. Visualizing quaternion rotation , 1994, TOGS.

[2] P. Crouch,et al. Splines of class Ck on non-euclidean spaces , 1995 .

[3] M. J. Kim,et al. Real time motion fairing with unit quaternions , 1998, Comput. Aided Des..

[4] Chafik Samir,et al. C1 interpolating Bézier path on Riemannian manifolds, with applications to 3D shape space , 2019, Appl. Math. Comput..

[5] John F. Hughes,et al. Smooth interpolation of orientations with angular velocity constraints using quaternions , 1992, SIGGRAPH.

[6] Bahram Ravani,et al. Geometric Construction of Bézier Motions , 1994 .

[7] Lyle Noakes,et al. Bézier curves and C2 interpolation in Riemannian manifolds , 2007, J. Approx. Theory.

[8] Vijay Kumar,et al. On the generation of smooth three-dimensional rigid body motions , 1998, IEEE Trans. Robotics Autom..

[9] Ken Shoemake,et al. Animating rotation with quaternion curves , 1985, SIGGRAPH.

[10] Pierre-Yves Gousenbourger,et al. Fitting Smooth Paths on Riemannian Manifolds: Endometrial Surface Reconstruction and Preoperative MRI-Based Navigation , 2015, GSI.