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Autores principales: Boutillon, Nathanaël, Hamel, François, Roques, Lionel
Formato: Preprint
Publicado: 2025
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Acceso en línea:https://arxiv.org/abs/2503.20390
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author Boutillon, Nathanaël
Hamel, François
Roques, Lionel
author_facet Boutillon, Nathanaël
Hamel, François
Roques, Lionel
contents We focus on the persistence and spreading properties for a heterogeneous Fisher-KPP equation with advection. After reviewing the different notions of persistence and spreading speeds, we focus on the effect of the direction of the advection term, denoted by $b$. First, we prove that changing $b$ to $-b$ can have an effect on the spreading speeds and the ability of persistence. Next, we provide a class of relationships between the intrinsic growth term $r$ and the advection term $b$ such that changing $b$ to $-b$ does not change the spreading speeds and the ability of persistence. We briefly mention the cases of slowly and rapidly varying environments, and bounded domains. Lastly, we show that in general, the spreading speeds are not controlled by the ability of persistence, and conversely. However, when there is no advection term, the spreading speeds are controlled by the ability of persistence, though the converse still does not hold.
format Preprint
id arxiv_https___arxiv_org_abs_2503_20390
institution arXiv
publishDate 2025
record_format arxiv
spellingShingle Periodic KPP equations: new insights into persistence, spreading, and the role of advection
Boutillon, Nathanaël
Hamel, François
Roques, Lionel
Analysis of PDEs
We focus on the persistence and spreading properties for a heterogeneous Fisher-KPP equation with advection. After reviewing the different notions of persistence and spreading speeds, we focus on the effect of the direction of the advection term, denoted by $b$. First, we prove that changing $b$ to $-b$ can have an effect on the spreading speeds and the ability of persistence. Next, we provide a class of relationships between the intrinsic growth term $r$ and the advection term $b$ such that changing $b$ to $-b$ does not change the spreading speeds and the ability of persistence. We briefly mention the cases of slowly and rapidly varying environments, and bounded domains. Lastly, we show that in general, the spreading speeds are not controlled by the ability of persistence, and conversely. However, when there is no advection term, the spreading speeds are controlled by the ability of persistence, though the converse still does not hold.
title Periodic KPP equations: new insights into persistence, spreading, and the role of advection
topic Analysis of PDEs
url https://arxiv.org/abs/2503.20390