Trivariate Polynomial Natural Spline for 3D Scattered Data Hermit Interpolation

Trivariate Polynomial Natural Spline for 3D Scattered Data Hermit Interpolation

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摘要 Consider a kind of Hermit interpolation for scattered data of 3D by trivariate polynomial natural spline, such that the objective energy functional （with natural boundary conditions） is minimal. By the spline function methods in Hilbert space and variational theory of splines, the characters of the interpolation solution and how to construct it are studied. One can easily find that the interpolation solution is a trivariate polynomial natural spline. Its expression is simple and the coefficients can be decided by a linear system. Some numerical examples are presented to demonstrate our methods. Consider a kind of Hermit interpolation for scattered data of 3D by trivariate polynomial natural spline, such that the objective energy functional （with natural boundary conditions） is minimal. By the spline function methods in Hilbert space and variational theory of splines, the characters of the interpolation solution and how to construct it are studied. One can easily find that the interpolation solution is a trivariate polynomial natural spline. Its expression is simple and the coefficients can be decided by a linear system. Some numerical examples are presented to demonstrate our methods.

作者 Xu YING-XIANG GUAN LU-TAI XU WEI-ZHI

机构地区 Department of Economics and Trade Department of Scientific Computation and Computer Application

出处《Communications in Mathematical Research》 CSCD 2012年第2期159-172,共14页 数学研究通讯（英文版）

基金 Ph.D.Programs Foundation (200805581022) of Ministry of Education of China

关键词 scattered data Hermit interpolation natural spline scattered data, Hermit interpolation, natural spline

分类号 O174.42 [理学—基础数学] TP391 [自动化与计算机技术—计算机应用技术]

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Trivariate Polynomial Natural Spline for 3D Scattered Data Hermit Interpolation

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