Hyunjin Ahn, Seung‐Yeal Ha, Doheon Kim, F. Schlöder, Woojoo Shim
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引用次数: 7
摘要
研究了完全光滑黎曼流形上簇的cucker - small (C-S)模型的平均场极限。为此,我们首先使用BBGKY层次正式推导了流形上的动力学流形C-S模型,并推导了对紧急动力学的几个先验估计。然后,利用广义胞内粒子法给出了从粒子模型到相应动力学模型的严格平均场极限。作为我们严格的平均场极限估计的副产品,我们还建立了导出的动力学模型的测量值解的全局存在性。与R d \mathbb {R}^d上的相应结果相比,我们的方法需要额外的完整假设和平行输运导数的固有先验界。作为一个具体的例子,我们验证了双曲空间H d \mathbb {H}^d满足我们提出的常值假设。
The mean-field limit of the Cucker-Smale model on complete Riemannian manifolds
We study the mean-field limit of the Cucker-Smale (C-S) model for flocking on complete smooth Riemannian manifolds. For this, we first formally derive the kinetic manifold C-S model on manifolds using the BBGKY hierarchy and derive several a priori estimates on emergent dynamics. Then, we present a rigorous mean-field limit from the particle model to the corresponding kinetic model by using the generalized particle-in-cell method. As a byproduct of our rigorous mean-field limit estimate, we also establish a global existence of a measure-valued solution for the derived kinetic model. Compared to the corresponding results on
R
d
\mathbb {R}^d
, our procedure requires additional assumption on holonomy and proper a priori bound on the derivative of parallel transports. As a concrete example, we verify that hyperbolic space
H
d
\mathbb {H}^d
satisfies our proposed standing assumptions.
期刊介绍:
The Quarterly of Applied Mathematics contains original papers in applied mathematics which have a close connection with applications. An author index appears in the last issue of each volume.
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