存在非局部斥力和引力的经典毛细管问题的最小值存在与否

IF 1.3 2区 数学 Q1 MATHEMATICS
Giulio Pascale
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引用次数: 0

摘要

我们研究了在欧几里得半空间所含集合的体积约束条件下,由毛细周长、非局部相互作用项和重力势能之和给出的能量函数的最小化问题。毛细周长为接触半空间边界的边界部分赋予一个恒定权重。非局部项由正内核 g 的双积分表示,而引力项由正势能 G 的积分表示。我们首先确定了小质量体系中体积受限最小值的存在性,以及最小值的几个定性性质。存在性结果适用于非局部相互作用项中的核的一般选择,包括吸引力-反弹力核。当非局部核 g(x)=1/|x|β 且β∈(0,2]时,我们还得到了大质量体系中体积受限最小化子的不存在性。最后,我们证明了对所有质量和一般非局部相互作用项都适用的最小化子的广义存在性结果,这意味着问题的下极值是由认为彼此位于 "无限距离 "的集合的有限不相交联盟实现的。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
Existence and nonexistence of minimizers for classical capillarity problems in presence of nonlocal repulsion and gravity
We investigate, under a volume constraint and among sets contained in a Euclidean half-space, the minimization problem of an energy functional given by the sum of a capillarity perimeter, a nonlocal interaction term and a gravitational potential energy. The capillarity perimeter assigns a constant weight to the portion of the boundary touching the boundary of the half-space. The nonlocal term is represented by a double integral of a positive kernel g, while the gravitational term is represented by the integral of a positive potential G.
We first establish existence of volume-constrained minimizers in the small mass regime, together with several qualitative properties of minimizers. The existence result holds for rather general choices of kernels in the nonlocal interaction term, including attractive–repulsive ones. When the nonlocal kernel g(x)=1/|x|β with β(0,2], we also obtain nonexistence of volume constrained minimizers in the large mass regime. Finally, we prove a generalized existence result of minimizers holding for all masses and general nonlocal interaction terms, meaning that the infimum of the problem is realized by a finite disjoint union of sets thought located at “infinite distance” one from the other.
These results stem from an application of quantitative isoperimetric inequalities for the capillarity problem in a half-space.
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来源期刊
CiteScore
3.30
自引率
0.00%
发文量
265
审稿时长
60 days
期刊介绍: Nonlinear Analysis focuses on papers that address significant problems in Nonlinear Analysis that have a sustainable and important impact on the development of new directions in the theory as well as potential applications. Review articles on important topics in Nonlinear Analysis are welcome as well. In particular, only papers within the areas of specialization of the Editorial Board Members will be considered. Authors are encouraged to check the areas of expertise of the Editorial Board in order to decide whether or not their papers are appropriate for this journal. The journal aims to apply very high standards in accepting papers for publication.
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