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The Unisolvence of Lagrange Interpolation with Symmetric Interpolation Space and Nodes in High Dimension

Authors :
Xie, Yulin
Tang, Yifa
Publication Year :
2024

Abstract

High-dimensional Lagrange interpolation plays a pivotal role in finite element methods, where ensuring the unisolvence and symmetry of its interpolation space and nodes set is crucial. In this paper, we leverage group action and group representation theories to precisely delineate the conditions for unisolvence. We establish a necessary condition for unisolvence: the symmetry of the interpolation nodes set is determined by the given interpolation space. Our findings not only contribute to a deeper theoretical understanding but also promise practical benefits by reducing the computational overhead associated with identifying appropriate interpolation nodes.<br />Comment: 18 pages

Details

Database :
arXiv
Publication Type :
Report
Accession number :
edsarx.2405.13430
Document Type :
Working Paper