Uniform trigonometric polynomial B-spline curves
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Publication:865991
DOI10.1007/BF02714091zbMath1185.41008MaRDI QIDQ865991
Xunnian Yang, Yonggang Lü, Guo-zhao Wang
Publication date: 20 February 2007
Published in: Science in China. Series F (Search for Journal in Brave)
Related Items (12)
A practical method for generating trigonometric polynomial surfaces over triangular domains ⋮ Construction and analysis of unified 4-point interpolating nonstationary subdivision surfaces ⋮ Mixed trigonometric and hyperbolic subdivision scheme with two tension and one shape parameters ⋮ Convergence analysis of regular dynamic Loop-like subdivision scheme ⋮ Normalized B-basis of the space of trigonometric polynomials and curve design ⋮ A generalized curve subdivision scheme of arbitrary order with a tension parameter ⋮ \(\omega\)B-splines ⋮ Multiresolution exponential B-splines and singularly perturbed boundary problem ⋮ Convergence and normal continuity analysis of nonstationary subdivision schemes near extraordinary vertices and faces ⋮ Non-stationary subdivision schemes: state of the art and perspectives ⋮ Optimal properties of the uniform algebraic trigonometric B-splines ⋮ Smooth reverse subdivision of uniform algebraic hyperbolic B-splines and wavelets
Cites Work
- The geometry of Tchebycheffian splines
- Curve and surface constructions using rational B-splines
- C-curves: An extension of cubic curves
- Two different forms of C-B-splines
- Chebyshev-Bernstein bases
- Helix splines as an example of affine Tchebycheffian splines
- A Theoretical Development for the Computer Generation and Display of Piecewise Polynomial Surfaces
- Shape preserving alternatives to the rational Bézier model
- A subdivision scheme for surfaces of revolution
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