Multivariate exact and falsified sampling approximation
Abstract
Approximation properties of the expansions , where is a matrix dilation, is either the sampled value of a signal at or the integral average of near (falsified sampled value), are studied. Error estimations in -norm, , are given in terms of the Fourier transform of . The approximation order depends on how smooth is , on the order of Strang-Fix condition for and on . Some special properties of are required. To estimate the approximation order of falsified sampling expansions we compare them with a differential expansions , where is an appropriate differential operator. Some concrete functions applicable for implementations are constructed. In particular, compactly supported splines and band-limited functions can be taken as . Some of these functions provide expansions interpolating a signal at the points .
Cite
@article{arxiv.1407.0321,
title = {Multivariate exact and falsified sampling approximation},
author = {A. Krivoshein and M. Skopina},
journal= {arXiv preprint arXiv:1407.0321},
year = {2014}
}
Comments
23 pages