relation: https://khub.utp.edu.my/scholars/3603/
title: Extension quintic wang-ball curves and surfaces
creator: Karim, S.A.A.
description: A new extension quintic Wang-Ball basis functions will be derived in this paper. It has four shape parameters that enable user to change the shape of the curves and surfaces. Choosing λ1 = μ1 and λ2 = μ2, the extension quintic Wang-Ball will be symmetric and when λ1 = μ1 = 0, λ2 = μ2 = 2, and when λ1 = μ1 = 1, λ2 = μ2 = 2, the extension quintic Wang-Ball reduces to the standard quintic Wang- Ball and standard quintic Said-Ball, respectively. Thus, the new extension quintic Wang-Ball consists of quintic Wang-Ball and quintic Said-Ball as its special case. Besides that, the first order of parametric continuity C1 and geometric G1 is more flexible compared with the original quintic Wang-Ball and quintic Said-Ball, respectively. Several numerical results justify our claim. © 2013 Pushpa Publishing House.
date: 2013
type: Article
type: PeerReviewed
identifier:   Karim, S.A.A.  (2013) Extension quintic wang-ball curves and surfaces.  Far East Journal of Mathematical Sciences, 75 (SPL.IS).  pp. 185-201.  ISSN 09720871     
relation: https://www.scopus.com/inward/record.uri?eid=2-s2.0-84878120126&partnerID=40&md5=9bc3f1574eb8e135e841235d3f32d504