Triangular surface patch based on bivariate Meyer-König-Zeller operator
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Publication:2278360
DOI10.1515/math-2019-0021OpenAlexW2942907144MaRDI QIDQ2278360
Publication date: 5 December 2019
Published in: Open Mathematics (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1515/math-2019-0021
Related Items (2)
Parametric generalization of the Meyer-König-Zeller operators ⋮ Curve and surface construction based on the generalized toric-Bernstein basis functions
Cites Work
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- Generalized Bézier curves and surfaces based on Lupaş \(q\)-analogue of Bernstein operator
- \(q\)-blossoming: A new approach to algorithms and identities for \(q\)-Bernstein bases and \(q\)-Bézier curves
- A generalization of rational Bernstein-Bézier curves
- Tensor product \(q\)-Bernstein polynomials
- Urn models and B-splines
- The rational Bernstein bases and the multirational blossoms
- Bivariate \(S\)-\(\lambda\) bases and \(S\)-\(\lambda\) surface patches
- \(q\)-Bernstein polynomials and Bézier curves
- Bernsteinsche Potenzreihen
- Markov chains and computer-aided geometric design: part I - problems and constraints
- Polya’s Urn Model and Computer Aided Geometric Design
- Generalization of Bernstein's polynomials to the infinite interval
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