UNIFORM STABILITY OF THE RELATIVISTIC CUCKER-SMALE MODEL AND ITS APPLICATION TO A MEAN-FIELD LIMIT

被引：12

作者：

Ahn, Hyunjin ^{[1
]}

Ha, Seung-Yeal ^{[1
,2
]}

Kim, Jeongho ^{[3
]}

机构：

[1] Seoul Natl Univ, Dept Math Sci, Seoul 08826, South Korea

[2] Seoul Natl Univ, Res Inst Math, Seoul 08826, South Korea

[3] Hanyang Univ, Res Inst Nat Sci, Dept Math, Seoul 04763, South Korea

来源：

COMMUNICATIONS ON PURE AND APPLIED ANALYSIS | 2021年 / 20卷 / 12期

基金：

新加坡国家研究基金会;

关键词：

  Flocking; kinetic model; relativistic Cucker-Smale model; uniform lq; p-stability; uniform mean-field limit; FLOCKING DYNAMICS; KURAMOTO; SYNCHRONIZATION; POPULATIONS; BEHAVIOR;

D O I：

10.3934/cpaa.2021156

中图分类号：

O29 [应用数学];

学科分类号：

070104 ;

摘要：

ABSTRACT. We present a uniform(-in-time) stability of the relativistic CuckerSmale (RCS) model in a suitable framework and study its application to a uniform mean-field limit which lifts earlier classical results for the CS model in a relativistic setting. For this, we first provide a sufficient framework for an exponential flocking for the RCS model in terms of the diameters of state observables, coupling strength and communication weight function, and then we use the obtained exponential flocking estimate to derive a uniform lq,pstability of the RCS model under appropriate conditions on initial data and system parameters. As an application of the derived uniform lq,p-stability estimate, we show that a uniform mean-field limit of the RCS model can be made for some admissible class of solutions uniformly in time. This justifies a formal derivation of the kinetic RCS equation [18] in a rigorous setting.

引用

页码：4209 / 4237

页数：29

共 29 条

[1] UNIFORM STABILITY OF THE CUCKER-SMALE MODEL AND ITS APPLICATION TO THE MEAN-FIELD LIMIT
Ha, Seung-Yeal
Kim, Jeongho
Zhang, Xiongtao
KINETIC AND RELATED MODELS, 2018, 11 (05) : 1157 - 1181
[2] UNIFORM STABILITY AND MEAN-FIELD LIMIT OF A THERMODYNAMIC CUCKER-SMALE MODEL
Ha, Seung-Yeal
Kim, Jeongho
Min, Chan Ho
Ruggeri, Tommaso
Zhang, Xiongtao
QUARTERLY OF APPLIED MATHEMATICS, 2019, 77 (01) : 131 - 176
[3] THE MEAN-FIELD LIMIT OF THE CUCKER-SMALE MODEL ON COMPLETE RIEMANNIAN MANIFOLDS
Ahn, Hyunjin
HA, Seung-yeal
Kim, Doheon
Schl, Franz wilhelm
Shim, Woojoo
QUARTERLY OF APPLIED MATHEMATICS, 2022, 80 (03) : 403 - 450
[4] ON THE MEAN-FIELD LIMIT OF THE CUCKER-SMALE MODEL WITH RANDOM BATCH METHOD
Wang, Yuelin
Lin, Yiwen
KINETIC AND RELATED MODELS, 2025,
[5] A PROBABILISTIC APPROACH FOR THE MEAN-FIELD LIMIT TO THE CUCKER-SMALE MODEL WITH A SINGULAR COMMUNICATION
Ha, Seung-Yeal
Kim, Jeongho
Pickl, Peter
Zhang, Xiongtao
KINETIC AND RELATED MODELS, 2019, 12 (05) : 1045 - 1067
[6] A SIMPLE PROOF OF THE CUCKER-SMALE FLOCKING DYNAMICS AND MEAN-FIELD LIMIT
Ha, Seung-Yeal
Liu, Jian-Guo
COMMUNICATIONS IN MATHEMATICAL SCIENCES, 2009, 7 (02) : 297 - 325
[7] ON THE MEAN FIELD LIMIT FOR CUCKER-SMALE MODELS
Natalini, Roberto
Paul, Thierry
DISCRETE AND CONTINUOUS DYNAMICAL SYSTEMS-SERIES B, 2022, 27 (05): : 2873 - 2889
[8] CUCKER-SMALE FLOCKING PARTICLES WITH MULTIPLICATIVE NOISES: STOCHASTIC MEAN-FIELD LIMIT AND PHASE TRANSITION
Choi, Young-Pil
Salem, Samir
KINETIC AND RELATED MODELS, 2019, 12 (03) : 573 - 592
[9] CUCKER-SMALE MODEL WITH FINITE SPEED OF INFORMATION PROPAGATION: WELL-POSEDNESS, FLOCKING AND MEAN-FIELD LIMIT
Haskovec, Jan
KINETIC AND RELATED MODELS, 2023, 16 (03) : 394 - 422
[10] UNIFORM STABILITY AND MEAN-FIELD LIMIT FOR THE AUGMENTED KURAMOTO MODEL
Ha, Seung-Yeal
Kim, Jeongho
Park, Jinyeong
Zhang, Xiongtao
NETWORKS AND HETEROGENEOUS MEDIA, 2018, 13 (02) : 297 - 322

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