Mixed hyperbolic/trigonometric spaces for design
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Publication:356184
DOI10.1016/j.camwa.2012.05.019zbMath1268.65025OpenAlexW2083827333MaRDI QIDQ356184
Martine Brilleaud, Marie-Laurence Mazure
Publication date: 25 July 2013
Published in: Computers \& Mathematics with Applications (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1016/j.camwa.2012.05.019
total positivitygeometric designextended Chebyshev spacesBernstein basescritical length for designoptimal bases
Related Items (15)
\(C^2\) tension splines construction based on a class of sixth-order ordinary differential equations ⋮ A practical method for generating trigonometric polynomial surfaces over triangular domains ⋮ Constructing totally positive piecewise Chebyshevian B-spline bases ⋮ Algorithm 1020: Computation of Multi-Degree Tchebycheffian B-Splines ⋮ Mixed hyperbolic/trigonometric non-stationary subdivision scheme ⋮ Design or not design? A numerical characterisation for piecewise Chebyshevian splines ⋮ Design with L-splines ⋮ Normalized B-basis of the space of trigonometric polynomials and curve design ⋮ Curves and surfaces construction based on new basis with exponential functions ⋮ On the critical lengths of cycloidal spaces ⋮ Piecewise Chebyshevian splines: interpolation versus design ⋮ Dynamic Evaluation of Free-Form Curves and Surfaces ⋮ A remarkable Wronskian with application to critical lengths of cycloidal spaces ⋮ Critical length: an alternative approach ⋮ Dynamic Evaluation of Exponential Polynomial Curves and Surfaces via Basis Transformation
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