Existence of ground states for free energies on the hyperbolic space

arXiv - MATH - Differential Geometry Pub Date : 2024-09-09 DOI:arxiv-2409.06022
José A. Carrillo, Razvan C. Fetecau, Hansol Park
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Abstract

We investigate a free energy functional that arises in aggregation-diffusion phenomena modelled by nonlocal interactions and local repulsion on the hyperbolic space $\bbh^\dm$. The free energy consists of two competing terms: an entropy, corresponding to slow nonlinear diffusion, that favours spreading, and an attractive interaction potential energy that favours aggregation. We establish necessary and sufficient conditions on the interaction potential for ground states to exist on the hyperbolic space $\bbh^\dm$. To prove our results we derived several Hardy-Littlewood-Sobolev (HLS)-type inequalities on general Cartan-Hadamard manifolds of bounded curvature, which have an interest in their own.
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双曲空间自由能的基态存在性
我们研究了在双曲空间 $\bbh^\dm$ 上以非局部相互作用和局部排斥为模型的聚集-扩散现象中产生的自由能函数。自由能由两个竞争项组成:一个是有利于扩散的熵,与缓慢的非线性扩散相对应;另一个是有利于聚集的吸引力相互作用势能。我们建立了双曲空间 $\bbh^\dm$ 上存在地面状态的相互作用势能的必要条件和充分条件。为了证明我们的结果,我们在有界曲率的一般卡尔坦-哈达玛流形上推导出了几个哈代-利特尔伍德-索博列夫(HLS)型不等式,这些不等式在该领域具有重要意义。
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arXiv - MATH - Differential Geometry
arXiv - MATH - Differential Geometry
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