Neutrosophic Bicubic Bezier Surface ApproximationModel for Uncertainty Data

IF 0.3 Q4 MATHEMATICS Matematika Pub Date : 2023-12-28 DOI:10.11113/matematika.v39.n3.1502
Siti Nur Idara Rosli, M. I. E. Zulkifly
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引用次数: 0

Abstract

Surfaces and their descriptions are significant in design, physical science, geology, and other natural phenomena. This study introduces a neutrosophic B´ezier surface approximation with a four-by-four control net for the bicubic situation. The neutrosophic notion defines the neutrosophic control net relation. The control net is mixed with the Bernstein basis function to generate a surface blending function and a neutrosophic bicubic B´ezier surface. Finally, the neutrosophic bicubic B´ezier surface is shown using an approximation approach and data points having neutrosophic properties.
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不确定性数据的中性双三次贝塞尔曲面逼近模型
曲面及其描述在设计、物理科学、地质学和其他自然现象中具有重要意义。本研究针对双三次方的情况,介绍了一种具有四乘四控制网的中性 B´ezier曲面近似。中性概念定义了中性控制网关系。控制网与伯恩斯坦基函数混合生成曲面混合函数和中性双三次方程 B´ezier 曲面。最后,使用近似方法和具有中性属性的数据点展示了中性双三次方程 B´ezier曲面。
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来源期刊
Matematika
Matematika MATHEMATICS-
自引率
25.00%
发文量
0
审稿时长
24 weeks
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