Singular limit problem for the Keller–Segel system and drift–diffusion system in scaling critical spaces

Singular limit problem for the Keller–Segel system and drift–diffusion system in scaling critical spaces

We consider a singular limit problem for the Cauchy problem of the Keller–Segel equation in a critical function space. We show that a solution to the Keller–Segel system in a scaling critical function space converges to a solution to the drift–diffusion system of parabolic–elliptic type (the simplif...

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Bibliographic Details
Published in:Journal of evolution equations Vol. 20; no. 2; pp. 421 - 457
Main Authors: Kurokiba, Masaki, Ogawa, Takayoshi
Format: Journal Article
Language:English
Published: Cham Springer International Publishing 2020
Springer Nature B.V
Subjects:
Analysis
Cauchy problems
Drift
Function space
Interpolation
Mathematics
Mathematics and Statistics
Relaxation time
Thermodynamics
Singular limit problem
Drift–diffusion system
78A38
Global well-posedness
Primary 35K15
Maximal regularity
Secondary 35K55
Critical space
Scaling invariance
35Q60
Keller–Segel equation
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Summary:We consider a singular limit problem for the Cauchy problem of the Keller–Segel equation in a critical function space. We show that a solution to the Keller–Segel system in a scaling critical function space converges to a solution to the drift–diffusion system of parabolic–elliptic type (the simplified Keller–Segel model) in the critical space strongly as the relaxation time τ → ∞ . For the proof of singular limit problem, we employ generalized maximal regularity for the heat equation and use it systematically with the sequence of embeddings between the interpolation spaces B ˙ q , σ s ( R n ) and F ˙ q , σ s ( R n ) .
ISSN:1424-3199
1424-3202
DOI:10.1007/s00028-019-00527-3