Matched wavelets for equidistant points

Elena A. Lebedeva

arXiv:2006.10346·math.CA·June 19, 2020·Int. J. Wavelets Multiresolution Inf. Process.

Matched wavelets for equidistant points

Elena A. Lebedeva

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TL;DR

This paper introduces a method for designing matched wavelets that interpolate equidistant data points, forming Riesz bases, and identifies Meyer wavelets suitable for uniform lattice data.

Contribution

It presents a novel approach to constructing matched wavelets for equidistant data, including the identification of Meyer wavelets for specific uniform lattices.

Findings

01

Matched wavelets form Riesz bases for equidistant data

02

Meyer wavelets interpolating on a uniform lattice are identified

03

The method enhances data interpolation accuracy using wavelets

Abstract

Matched wavelets interpolating equidistant data are designed. These wavelets form Riesz bases. Meyer wavelets that interpolate data on a particular uniform lattice are found.

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