Estimates for Interpolation Projectors and Related Problems in Computational Geometry
Abstract
This paper contains a survey of results obtained by the authors mostly during the past few years and published by 2021. In particular, we present the best of known estimates of numerical characteristics related to the research theme. Sections: 1. Introduction. 2. The case when is an Hadamard number. 3. Estimates for the minimal absorption index of a cube by a simplex. 4. Estimates for the minimal norm of a projector in linear interpolation on a cube in . 5. Estimates of numbers and . 6. Simplices satisfying the inclusions . 7. Perfect simplices. 8. Equisecting simplices. 9. Properties of -matrices of order having maximal determinant. 10. Problems for a simplex and a Euclidean ball. 11. Linear interpolation on a Euclidean ball. Bibliography: 56 titles. Keywords: simplex, cube, Euclidean ball, homothety, axial diameter, absorption index, Hadamard number, interpolation, projector, norm, estimate.
Cite
@article{arxiv.2108.00880,
title = {Estimates for Interpolation Projectors and Related Problems in Computational Geometry},
author = {Mikhail Nevskii and Alexey Ukhalov},
journal= {arXiv preprint arXiv:2108.00880},
year = {2021}
}
Comments
48 pages, 10 figures