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Main Authors: Cheng, Xinyu, Li, Dong, Yang, Wen
Format: Preprint
Published: 2022
Subjects:
Online Access:https://arxiv.org/abs/2210.03309
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author Cheng, Xinyu
Li, Dong
Yang, Wen
author_facet Cheng, Xinyu
Li, Dong
Yang, Wen
contents In \cite{gmw2022}, Guan, Murugan and Wei established the equivalence of the classical Helmholtz equation with a ``fractional Helmholtz" equation in which the Laplacian operator is replaced by the nonlocal fractional Laplacian operator. More general equivalence results are obtained for symbols which are complete Bernstein and satisfy additional regularity conditions. In this work we introduce a novel and general set-up for this Helmholtz equivalence problem. We show that under very mild and easy-to-check conditions on the Fourier multiplier, the general Helmholtz equation can be effectively reduced to a localization statement on the support of the symbol.
format Preprint
id arxiv_https___arxiv_org_abs_2210_03309
institution arXiv
publishDate 2022
record_format arxiv
spellingShingle Localization for general Helmholtz
Cheng, Xinyu
Li, Dong
Yang, Wen
Analysis of PDEs
In \cite{gmw2022}, Guan, Murugan and Wei established the equivalence of the classical Helmholtz equation with a ``fractional Helmholtz" equation in which the Laplacian operator is replaced by the nonlocal fractional Laplacian operator. More general equivalence results are obtained for symbols which are complete Bernstein and satisfy additional regularity conditions. In this work we introduce a novel and general set-up for this Helmholtz equivalence problem. We show that under very mild and easy-to-check conditions on the Fourier multiplier, the general Helmholtz equation can be effectively reduced to a localization statement on the support of the symbol.
title Localization for general Helmholtz
topic Analysis of PDEs
url https://arxiv.org/abs/2210.03309