Whitney extensions and orthonormal expansions
Abstract
The Whitney near extension problem for finite sets in asks the following: Let be a near distortion on a finite set with certain geometry. How to decide whether extends to a smooth, one to one and onto near distortion which agrees with on and with Euclidean motions in . The Whitney near extension problem for compact sets in open subsets of asks the following: Let be open and let be a compact set. Let be a smooth near isometry. How to decide if there exists a smooth one-to-one and onto near isometry which extends on and agrees with Euclidean motions on . The classical Whitney extension problem asks the following: Let be a map defined on an arbitrary set . How can one decide whether extends to a map which agrees with on and is in , the space of functions from to whose derivatives of order are continuous and bounded. In this paper, we survey some of our work on the near Whitney extension problem [2] in . Thereafter, we survey some of our work on weighted convergence of orthonormal expansions in [3] and present a result of [13]. The motivation for doing this is motivated by interesting connections between Whitney extension theorems, Taylor series and Fourier expansions. Finally, we raise various open questions to study.
Cite
@article{arxiv.2302.08045,
title = {Whitney extensions and orthonormal expansions},
author = {S. B. Damelin},
journal= {arXiv preprint arXiv:2302.08045},
year = {2023}
}
Comments
arXiv admin note: text overlap with arXiv:2103.09748