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Main Author: Jang, Jiwoong
Format: Preprint
Published: 2024
Subjects:
Online Access:https://arxiv.org/abs/2401.07949
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author Jang, Jiwoong
author_facet Jang, Jiwoong
contents Proving homogenization has been a subtle issue for geometric equations due to the discontinuity when the gradient vanishes. A sufficient condition for periodic homogenization using perturbed correctors is suggested in the literature [3] to overcome this difficulty. However, some noncoercive equations do not satisfy this condition. In this note, we prove homogenization of geometric equations without using perturbed correctors, and therefore we conclude homogenization for the noncoercive equations. Also, we provide a rate of periodic homogenization of coercive geometric equations by utilizing the fact that they remain coercive under perturbation. We also present an example that homogenizes with a rate slower than $Ω(\varepsilon)$.
format Preprint
id arxiv_https___arxiv_org_abs_2401_07949
institution arXiv
publishDate 2024
record_format arxiv
spellingShingle Periodic homogenization of geometric equations without perturbed correctors
Jang, Jiwoong
Analysis of PDEs
35B10, 35B27, 35B40, 35D40
Proving homogenization has been a subtle issue for geometric equations due to the discontinuity when the gradient vanishes. A sufficient condition for periodic homogenization using perturbed correctors is suggested in the literature [3] to overcome this difficulty. However, some noncoercive equations do not satisfy this condition. In this note, we prove homogenization of geometric equations without using perturbed correctors, and therefore we conclude homogenization for the noncoercive equations. Also, we provide a rate of periodic homogenization of coercive geometric equations by utilizing the fact that they remain coercive under perturbation. We also present an example that homogenizes with a rate slower than $Ω(\varepsilon)$.
title Periodic homogenization of geometric equations without perturbed correctors
topic Analysis of PDEs
35B10, 35B27, 35B40, 35D40
url https://arxiv.org/abs/2401.07949