ASYMPTOTIC STABILITY AND THE HAIR-TRIGGER EFFECT IN CAUCHY PROBLEM OF THE FLUX-LIMITED KELLER-SEGEL SYSTEM WITH LOGISTIC SOURCE

De-Ji-Xiang-Mao; Jing Li; Yifu Wang

doi:10.3934/dcdsb.2024138

ASYMPTOTIC STABILITY AND THE HAIR-TRIGGER EFFECT IN CAUCHY PROBLEM OF THE FLUX-LIMITED KELLER-SEGEL SYSTEM WITH LOGISTIC SOURCE

De-Ji-Xiang-Mao, Jing Li^*, Yifu Wang

^*Corresponding author for this work

School of Mathematics and Statistics

Minzu University of China

Research output: Contribution to journal › Article › peer-review

Abstract

This paper was concerned with Cauchy problem of the parabolic-parabolic flux-limited Keller-Segel system with logistic source. We discussed the global existence and global boundedness of the classical solution. By constructing auxiliary functions with quasi-linear structures, we can directly obtained the persistence and the asymptotic stability of the positive constant equilibria for strictly positive initial datum. Moreover, for any initial datum satisfying ^R_B(x,δ₎ ln u0(s)ds ∈ L^∞(R^N) for some δ > 0, the hair-trigger effect was detected by constructing the localized Lyapunov type functional.

Original language	English
Pages (from-to)	1517-1532
Number of pages	16
Journal	Discrete and Continuous Dynamical Systems - Series B
Volume	30
Issue number	5
DOIs	https://doi.org/10.3934/dcdsb.2024138
Publication status	Published - May 2025

Keywords

Cauchy problem
Flux-limited Keller-Segel system
asymptotic stability
hair-trigger effect
logistic source
persistence

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abstract = "This paper was concerned with Cauchy problem of the parabolic-parabolic flux-limited Keller-Segel system with logistic source. We discussed the global existence and global boundedness of the classical solution. By constructing auxiliary functions with quasi-linear structures, we can directly obtained the persistence and the asymptotic stability of the positive constant equilibria for strictly positive initial datum. Moreover, for any initial datum satisfying RB(x,δ) ln u0(s)ds ∈ L∞(RN) for some δ > 0, the hair-trigger effect was detected by constructing the localized Lyapunov type functional.",

keywords = "Cauchy problem, Flux-limited Keller-Segel system, asymptotic stability, hair-trigger effect, logistic source, persistence",

author = "De-Ji-Xiang-Mao and Jing Li and Yifu Wang",

year = "2025",

month = may,

doi = "10.3934/dcdsb.2024138",

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AU - Li, Jing

AU - Wang, Yifu

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N2 - This paper was concerned with Cauchy problem of the parabolic-parabolic flux-limited Keller-Segel system with logistic source. We discussed the global existence and global boundedness of the classical solution. By constructing auxiliary functions with quasi-linear structures, we can directly obtained the persistence and the asymptotic stability of the positive constant equilibria for strictly positive initial datum. Moreover, for any initial datum satisfying RB(x,δ) ln u0(s)ds ∈ L∞(RN) for some δ > 0, the hair-trigger effect was detected by constructing the localized Lyapunov type functional.

AB - This paper was concerned with Cauchy problem of the parabolic-parabolic flux-limited Keller-Segel system with logistic source. We discussed the global existence and global boundedness of the classical solution. By constructing auxiliary functions with quasi-linear structures, we can directly obtained the persistence and the asymptotic stability of the positive constant equilibria for strictly positive initial datum. Moreover, for any initial datum satisfying RB(x,δ) ln u0(s)ds ∈ L∞(RN) for some δ > 0, the hair-trigger effect was detected by constructing the localized Lyapunov type functional.

KW - Cauchy problem

KW - Flux-limited Keller-Segel system

KW - asymptotic stability

KW - hair-trigger effect

KW - logistic source

KW - persistence

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VL - 30

SP - 1517

EP - 1532

JO - Discrete and Continuous Dynamical Systems - Series B

JF - Discrete and Continuous Dynamical Systems - Series B

IS - 5

ER -

ASYMPTOTIC STABILITY AND THE HAIR-TRIGGER EFFECT IN CAUCHY PROBLEM OF THE FLUX-LIMITED KELLER-SEGEL SYSTEM WITH LOGISTIC SOURCE

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Keywords

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