English

Multivariate exact and falsified sampling approximation

Functional Analysis 2014-07-02 v1

Abstract

Approximation properties of the expansions kzdckϕ(Mjx+k)\sum_{k\in{\mathbb z}^d}c_k\phi(M^jx+k), where MM is a matrix dilation, ckc_k is either the sampled value of a signal ff at MjkM^{-j}k or the integral average of ff near MjkM^{-j}k (falsified sampled value), are studied. Error estimations in LpL_p-norm, 2p2\le p\le\infty, are given in terms of the Fourier transform of ff. The approximation order depends on how smooth is ff, on the order of Strang-Fix condition for ϕ\phi and on MM. Some special properties of ϕ\phi are required. To estimate the approximation order of falsified sampling expansions we compare them with a differential expansions kzdLf(Mj)(k)ϕ(Mjx+k)\sum_{k\in\,{\mathbb z}^d} Lf(M^{-j}\cdot)(-k)\phi(M^jx+k), where LL is an appropriate differential operator. Some concrete functions ϕ\phi applicable for implementations are constructed. In particular, compactly supported splines and band-limited functions can be taken as ϕ\phi. Some of these functions provide expansions interpolating a signal at the points MjkM^{-j}k.

Keywords

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

R2 v1 2026-06-22T04:52:42.583Z