类芬斯勒空间中的绝对连续曲线

IF 0.6 4区 数学 Q3 MATHEMATICS Differential Geometry and its Applications Pub Date : 2024-05-23 DOI:10.1016/j.difgeo.2024.102154
Fue Zhang , Wei Zhao
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引用次数: 0

摘要

本文致力于研究芬斯勒结构诱导的非对称度量空间中的绝对连续曲线。首先,对于芬斯勒流形诱导的非对称空间,我们证明了当它们的域是有界闭合区间时,三种不同的绝对连续曲线是重合的。作为应用,我们得到了 Finsler 背景下梯度流的普遍存在性和正则性定理。其次,我们研究了 Finsler 流形上 Wasserstein 空间中的绝对连续曲线,并在此背景下建立了 Lisini 结构定理,该定理用集中于基 Finsler 流形中绝对连续曲线的动力学转移计划来表征 Wasserstein 空间中绝对连续曲线的性质。此外,我们还建立了连续性方程与瓦瑟斯坦空间中绝对连续曲线之间的密切联系。最后但并非最不重要的一点是,我们还考虑了非光滑的 "类 Finsler "空间,在这种情况下,上述大部分结果仍然有效。本文构建了各种模型示例,指出了非对称和对称设置之间的真正差异。
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Absolutely continuous curves in Finsler-like spaces

The present paper is devoted to the investigation of absolutely continuous curves in asymmetric metric spaces induced by Finsler structures. Firstly, for asymmetric spaces induced by Finsler manifolds, we show that three different kinds of absolutely continuous curves coincide when their domains are bounded closed intervals. As an application, a universal existence and regularity theorem for gradient flow is obtained in the Finsler setting. Secondly, we study absolutely continuous curves in Wasserstein spaces over Finsler manifolds and establish the Lisini structure theorem in this setting, which characterize the nature of absolutely continuous curves in Wasserstein spaces in terms of dynamical transference plans concentrated on absolutely continuous curves in base Finsler manifolds. Besides, a close relation between continuity equations and absolutely continuous curves in Wasserstein spaces is founded. Last but not least, we also consider nonsmooth “Finsler-like” spaces, in which case most of the aforementioned results remain valid. Various model examples are constructed in this paper, which point out genuine differences between the asymmetric and symmetric settings.

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来源期刊
CiteScore
1.00
自引率
20.00%
发文量
81
审稿时长
6-12 weeks
期刊介绍: Differential Geometry and its Applications publishes original research papers and survey papers in differential geometry and in all interdisciplinary areas in mathematics which use differential geometric methods and investigate geometrical structures. The following main areas are covered: differential equations on manifolds, global analysis, Lie groups, local and global differential geometry, the calculus of variations on manifolds, topology of manifolds, and mathematical physics.
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