The Discrete Approximation Problem for a Special Case of Hermite-Type Polynomial Interpolation

被引：0

作者：

Gong Yihe ^{[1
]}

Jiang Xue ^{[2
]}

Zhang Shugong ^{[3
]}

机构：

[1] Northeast Elect Power Univ, Coll Sci, Jilin 132000, Jilin, Peoples R China

[2] Shenyang Normal Univ, Sch Math & Systemat Sci, Shenyang 110034, Peoples R China

[3] Jilin Univ, Inst Math, Key Lab Symbol Computat & Knowledge Engn, Minist Educ, Changchun 130012, Peoples R China

来源：

JOURNAL OF SYSTEMS SCIENCE & COMPLEXITY | 2022年 / 35卷 / 05期

基金：

中国国家自然科学基金;

关键词：

Discrete approximation problem; Hermite interpolation; Lagrange interpolation; LAGRANGE; LIMITS; LATTICES; SUBSPACE;

D O I：

10.1007/s11424-022-1068-x

中图分类号：

O1 [数学];

学科分类号：

0701 ; 070101 ;

摘要：

Every univariate Hermite interpolation problem can be written as a pointwise limit of Lagrange interpolants. However, this property is not preserved for the multivariate case. In this paper, the authors first generalize the result of P. Gniadek. As an application, the authors consider the discrete approximation problem for a special case when the interpolation condition contains all partial derivatives of order less than n and one nth order differential polynomial. In addition, for the case of n >= 3, the authors use the concept of Cartesian tensors to give a sufficient condition to find a sequence of discrete points, such that the Lagrange interpolation problems at these points converge to the given Hermite-type interpolant.

引用

页码：2004 / 2015

页数：12

共 50 条

[31] De Boor–Fix functionals and Hermite boundary conditions in the polynomial spline interpolation problem
Yuriy S. Volkov
[J]. European Journal of Mathematics, 2021, 7 : 396 - 403
[32] On a Special Case of the two-variable Newton Interpolation Polynomial
Varsamis, Dimitris N.
Karampetakis, Nicholas P.
[J]. 2012 2ND INTERNATIONAL CONFERENCE ON COMMUNICATIONS, COMPUTING AND CONTROL APPLICATIONS (CCCA), 2012,
[33] De Boor-Fix functionals and Hermite boundary conditions in the polynomial spline interpolation problem
Volkov, Yuriy S.
[J]. EUROPEAN JOURNAL OF MATHEMATICS, 2021, 7 (01) : 396 - 403
[34] A Fully Polynomial-Time Approximation Scheme for a Special Case of a Balanced 2-Clustering Problem
Kel'manov, Alexander
Motkova, Anna
[J]. DISCRETE OPTIMIZATION AND OPERATIONS RESEARCH, DOOR 2016, 2016, 9869 : 182 - 192
[35] RELATION BETWEEN PADE-TYPE APPROXIMATION AND POLYNOMIAL INTERPOLATION IN SEVERAL VARIABLES
KIDA, S
[J]. APPLIED NUMERICAL MATHEMATICS, 1990, 6 (05) : 393 - 404
[36] Polynomial interpolation of cryptographic functions related to Diffie-Hellman and discrete logarithm problem
Kiltz, E
Winterhof, A
[J]. DISCRETE APPLIED MATHEMATICS, 2006, 154 (02) : 326 - 336
[37] The Hamburger moment problem and weighted polynomial approximation on discrete subsets of the real line
Alexander Borichev
Mikhail Sodin
[J]. Journal d’Analyse Mathematique, 1998, 76 : 219 - 264
[38] The Hamburger moment problem and weighted polynomial approximation on discrete subsets of the real line
Borichev, A
Sodin, M
[J]. JOURNAL D ANALYSE MATHEMATIQUE, 1998, 76 (1): : 219 - 264
[39] Fully polynomial-time approximation scheme for a special case of a quadratic Euclidean 2-clustering problem
Kel'manov, A. V.
Khandeev, V. I.
[J]. COMPUTATIONAL MATHEMATICS AND MATHEMATICAL PHYSICS, 2016, 56 (02) : 334 - 341
[40] Fully polynomial-time approximation scheme for a special case of a quadratic Euclidean 2-clustering problem
A. V. Kel’manov
V. I. Khandeev
[J]. Computational Mathematics and Mathematical Physics, 2016, 56 : 334 - 341

← 1 2 3 4 5 →