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Main Authors: Garcés, Inmaculada, Mulet, Pep, Ruiz-Álvarez, Juan, Shu, Chi-Wang, Yáñez, Dionisio F.
Format: Preprint
Published: 2026
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Online Access:https://arxiv.org/abs/2603.04633
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author Garcés, Inmaculada
Mulet, Pep
Ruiz-Álvarez, Juan
Shu, Chi-Wang
Yáñez, Dionisio F.
author_facet Garcés, Inmaculada
Mulet, Pep
Ruiz-Álvarez, Juan
Shu, Chi-Wang
Yáñez, Dionisio F.
contents Accurate and efficient reconstruction techniques are essential in multiresolution analysis and image compression, particularly when the data are represented as cell averages. In this work, we present a non-separable progressive multivariate Weighted Essentially Non-Oscillatory (WENO) scheme specifically designed for cell-average data, with applications to digital image processing. The proposed method extends Harten's multiresolution framework through a non-linear WENO reconstruction adapted to the cell-average context, achieving high-order accuracy in smooth regions and stable, non-oscillatory behavior near discontinuities. We also establish theoretical results regarding the consistency and approximation properties of the method. Finally, several numerical experiments on piecewise smooth functions and digital images are presented to demonstrate its performance and validate its effectiveness against the linear Lagrange reconstruction of the same order of accuracy.
format Preprint
id arxiv_https___arxiv_org_abs_2603_04633
institution arXiv
publishDate 2026
record_format arxiv
spellingShingle A Cell-Average Non-Separable Progressive Multivariate WENO Method for Image Processing Applications
Garcés, Inmaculada
Mulet, Pep
Ruiz-Álvarez, Juan
Shu, Chi-Wang
Yáñez, Dionisio F.
Numerical Analysis
Accurate and efficient reconstruction techniques are essential in multiresolution analysis and image compression, particularly when the data are represented as cell averages. In this work, we present a non-separable progressive multivariate Weighted Essentially Non-Oscillatory (WENO) scheme specifically designed for cell-average data, with applications to digital image processing. The proposed method extends Harten's multiresolution framework through a non-linear WENO reconstruction adapted to the cell-average context, achieving high-order accuracy in smooth regions and stable, non-oscillatory behavior near discontinuities. We also establish theoretical results regarding the consistency and approximation properties of the method. Finally, several numerical experiments on piecewise smooth functions and digital images are presented to demonstrate its performance and validate its effectiveness against the linear Lagrange reconstruction of the same order of accuracy.
title A Cell-Average Non-Separable Progressive Multivariate WENO Method for Image Processing Applications
topic Numerical Analysis
url https://arxiv.org/abs/2603.04633