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Hauptverfasser: Bonnet-Eymard, Romain, Coulombel, Jean-François, Faye, Grégory
Format: Preprint
Veröffentlicht: 2025
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Online-Zugang:https://arxiv.org/abs/2504.00667
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author Bonnet-Eymard, Romain
Coulombel, Jean-François
Faye, Grégory
author_facet Bonnet-Eymard, Romain
Coulombel, Jean-François
Faye, Grégory
contents The purpose of this note is to investigate the coupling of Dirichlet and Neumann numerical boundary conditions for the transport equation set on an interval. When one starts with a stable finite difference scheme on the lattice $\mathbb{Z}$ and each numerical boundary condition is taken separately with the Neumann extrapolation condition at the outflow boundary, the corresponding numerical semigroup on a half-line is known to be bounded. It is also known that the coupling of such numerical boundary conditions on a compact interval yields a stable approximation, even though large time exponentially growing modes may occur. We review the different stability estimates associated with these numerical boundary conditions and give explicit examples of such exponential growth phenomena for finite difference schemes with ''small'' stencils. This provides numerical evidence for the optimality of some stability estimates on the interval.
format Preprint
id arxiv_https___arxiv_org_abs_2504_00667
institution arXiv
publishDate 2025
record_format arxiv
spellingShingle Amplification of numerical wave packets for transport equations with two boundaries
Bonnet-Eymard, Romain
Coulombel, Jean-François
Faye, Grégory
Numerical Analysis
The purpose of this note is to investigate the coupling of Dirichlet and Neumann numerical boundary conditions for the transport equation set on an interval. When one starts with a stable finite difference scheme on the lattice $\mathbb{Z}$ and each numerical boundary condition is taken separately with the Neumann extrapolation condition at the outflow boundary, the corresponding numerical semigroup on a half-line is known to be bounded. It is also known that the coupling of such numerical boundary conditions on a compact interval yields a stable approximation, even though large time exponentially growing modes may occur. We review the different stability estimates associated with these numerical boundary conditions and give explicit examples of such exponential growth phenomena for finite difference schemes with ''small'' stencils. This provides numerical evidence for the optimality of some stability estimates on the interval.
title Amplification of numerical wave packets for transport equations with two boundaries
topic Numerical Analysis
url https://arxiv.org/abs/2504.00667