Regular algebraic curve segments (I)-definitions and characteristics
Computer Aided Geometric Design
Regular algebraic curve segments (II)-interpolation and approximation
Computer Aided Geometric Design
Regular algebraic curve segments (III)—applications in interactive design and data fitting
Computer Aided Geometric Design
Curves and Surfaces for Computer-Aided Geometric Design: A Practical Code
Curves and Surfaces for Computer-Aided Geometric Design: A Practical Code
Parametric splines on a hyperbolic paraboloid
Journal of Computational and Applied Mathematics
Construction of flexible blending parametric surfaces via curves
Mathematics and Computers in Simulation
Spline on a generalized hyperbolic paraboloid
Journal of Computational and Applied Mathematics
| Hi-index | 7.29 |
In this paper, a generalized hyperbolic paraboloid is represented by bi-parametrization equipped with a shape parameter, which can appropriately control approximate behavior of splines. A unified method is presented to construct G^2-continuous approximate spline curves and surfaces composed of a kind of curve segments and surface patches respectively. Any segment of this kind lying on the generalized hyperbolic paraboloid, is of certain tangent directions and bounded curvatures at two endpoints, that can be done by constraining the two parameters with a functional relationship and selecting suitable weight functions. There is also an alternative form given to improve the approximating effect. Moreover, the kind of patches is produced by tensor product of the same basis functions as for the curves. These segments therefore are conveniently connected into a curve with G^2-continuity, as are the patches into a G^2-continuous surface, both of which can arbitrarily approach their corresponding control polygon.