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Bibliographic Details
Main Authors: Li, Tongtong, Gelb, Anne
Format: Preprint
Published: 2024
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Online Access:https://arxiv.org/abs/2406.15977
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author Li, Tongtong
Gelb, Anne
author_facet Li, Tongtong
Gelb, Anne
contents Fourier partial sum approximations yield exponential accuracy for smooth and periodic functions, but produce the infamous Gibbs phenomenon for non-periodic ones. Spectral reprojection resolves the Gibbs phenomenon by projecting the Fourier partial sum onto a Gibbs complementary basis, often prescribed as the Gegenbauer polynomials. Noise in the Fourier data and the Runge phenomenon both degrade the quality of the Gegenbauer reconstruction solution, however. Motivated by its theoretical convergence properties, this paper proposes a new Bayesian framework for spectral reprojection, which allows a greater understanding of the impact of noise on the reprojection method from a statistical point of view. We are also able to improve the robustness with respect to the Gegenbauer polynomials parameters. Finally, the framework provides a mechanism to quantify the uncertainty of the solution estimate.
format Preprint
id arxiv_https___arxiv_org_abs_2406_15977
institution arXiv
publishDate 2024
record_format arxiv
spellingShingle A Bayesian framework for spectral reprojection
Li, Tongtong
Gelb, Anne
Numerical Analysis
Fourier partial sum approximations yield exponential accuracy for smooth and periodic functions, but produce the infamous Gibbs phenomenon for non-periodic ones. Spectral reprojection resolves the Gibbs phenomenon by projecting the Fourier partial sum onto a Gibbs complementary basis, often prescribed as the Gegenbauer polynomials. Noise in the Fourier data and the Runge phenomenon both degrade the quality of the Gegenbauer reconstruction solution, however. Motivated by its theoretical convergence properties, this paper proposes a new Bayesian framework for spectral reprojection, which allows a greater understanding of the impact of noise on the reprojection method from a statistical point of view. We are also able to improve the robustness with respect to the Gegenbauer polynomials parameters. Finally, the framework provides a mechanism to quantify the uncertainty of the solution estimate.
title A Bayesian framework for spectral reprojection
topic Numerical Analysis
url https://arxiv.org/abs/2406.15977