Variationally Improved Bézier Surfaces with Shifted Knots

The Plateau-Bézier problem with shifted knots is to find the surface of minimal area amongst all the Bézier surfaces with shifted knots spanned by the admitted boundary. Instead of variational minimization of usual area functional, the quasi-minimal Bézier surface with shifted knots is obtained as t...

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Main Authors: Daud Ahmad, Kanwal Hassan, M. Khalid Mahmood, Javaid Ali, Ilyas Khan, M. Fayz-Al-Asad
Format: Article
Language:English
Published: Hindawi Limited 2021-01-01
Series:Advances in Mathematical Physics
Online Access:http://dx.doi.org/10.1155/2021/9978633
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spelling doaj-b694c6d497ec4312825fd65e0f61c0622021-09-06T00:01:25ZengHindawi LimitedAdvances in Mathematical Physics1687-91392021-01-01202110.1155/2021/9978633Variationally Improved Bézier Surfaces with Shifted KnotsDaud Ahmad0Kanwal Hassan1M. Khalid Mahmood2Javaid Ali3Ilyas Khan4M. Fayz-Al-Asad5Department of MathematicsDepartment of MathematicsDepartment of MathematicsDepartment of MathematicsDepartment of MathematicsBangladesh University of Engineering and Technology (BUET)The Plateau-Bézier problem with shifted knots is to find the surface of minimal area amongst all the Bézier surfaces with shifted knots spanned by the admitted boundary. Instead of variational minimization of usual area functional, the quasi-minimal Bézier surface with shifted knots is obtained as the solution of variational minimization of Dirichlet functional that turns up as the sum of two integrals and the vanishing condition gives us the system of linear algebraic constraints on the control points. The coefficients of these control points bear symmetry for the pair of summation indices as well as for the pair of free indices. These linear constraints are then solved for unknown interior control points in terms of given boundary control points to get quasi-minimal Bézier surface with shifted knots. The functional gradient of the surface gives possible candidate functions as the minimizers of the aforementioned Dirichlet functional; when solved for unknown interior control points, it results in a surface of minimal area called quasi-minimal Bézier surface. In particular, it is implemented on a biquadratic Bézier surface by expressing the unknown control point P11 as the linear combination of the known control points in this case. This can be implemented to Bézier surfaces with shifted knots of higher degree, as well if desired.http://dx.doi.org/10.1155/2021/9978633
collection DOAJ
language English
format Article
sources DOAJ
author Daud Ahmad
Kanwal Hassan
M. Khalid Mahmood
Javaid Ali
Ilyas Khan
M. Fayz-Al-Asad
spellingShingle Daud Ahmad
Kanwal Hassan
M. Khalid Mahmood
Javaid Ali
Ilyas Khan
M. Fayz-Al-Asad
Variationally Improved Bézier Surfaces with Shifted Knots
Advances in Mathematical Physics
author_facet Daud Ahmad
Kanwal Hassan
M. Khalid Mahmood
Javaid Ali
Ilyas Khan
M. Fayz-Al-Asad
author_sort Daud Ahmad
title Variationally Improved Bézier Surfaces with Shifted Knots
title_short Variationally Improved Bézier Surfaces with Shifted Knots
title_full Variationally Improved Bézier Surfaces with Shifted Knots
title_fullStr Variationally Improved Bézier Surfaces with Shifted Knots
title_full_unstemmed Variationally Improved Bézier Surfaces with Shifted Knots
title_sort variationally improved bézier surfaces with shifted knots
publisher Hindawi Limited
series Advances in Mathematical Physics
issn 1687-9139
publishDate 2021-01-01
description The Plateau-Bézier problem with shifted knots is to find the surface of minimal area amongst all the Bézier surfaces with shifted knots spanned by the admitted boundary. Instead of variational minimization of usual area functional, the quasi-minimal Bézier surface with shifted knots is obtained as the solution of variational minimization of Dirichlet functional that turns up as the sum of two integrals and the vanishing condition gives us the system of linear algebraic constraints on the control points. The coefficients of these control points bear symmetry for the pair of summation indices as well as for the pair of free indices. These linear constraints are then solved for unknown interior control points in terms of given boundary control points to get quasi-minimal Bézier surface with shifted knots. The functional gradient of the surface gives possible candidate functions as the minimizers of the aforementioned Dirichlet functional; when solved for unknown interior control points, it results in a surface of minimal area called quasi-minimal Bézier surface. In particular, it is implemented on a biquadratic Bézier surface by expressing the unknown control point P11 as the linear combination of the known control points in this case. This can be implemented to Bézier surfaces with shifted knots of higher degree, as well if desired.
url http://dx.doi.org/10.1155/2021/9978633
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