拉克索空间的最大方向导数

IF 1.2 2区数学 Q1 MATHEMATICS Communications in Contemporary Mathematics Pub Date : 2024-05-15 DOI:10.1142/s0219199724500172

Marco Capolli, Andrea Pinamonti, Gareth Speight

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引用次数: 0

摘要

我们研究了定义在拉克索空间上的 Lipschitz 函数的最大方向导数与可微性之间的联系。我们证明，Lipschitz 函数的最大方向导数只意味着σ多孔点集的可微性。另一方面，除了 σ 多孔点集之外，到定点的距离在任何地方都是可微分的。这种行为与之前研究的欧几里得空间、卡诺群和巴拿赫空间完全不同。因此，在这些空间中使用的技术不能推广到公度量空间。

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Maximal directional derivatives in Laakso space

We investigate the connection between maximal directional derivatives and differentiability for Lipschitz functions defined on Laakso space. We show that maximality of a directional derivative for a Lipschitz function implies differentiability only for a $σ$ -porous set of points. On the other hand, the distance to a fixed point is differentiable everywhere except for a $σ$ -porous set of points. This behavior is completely different to the previously studied settings of Euclidean spaces, Carnot groups and Banach spaces. Hence, the techniques used in these spaces do not generalize to metric measure spaces.

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来源期刊

Communications in Contemporary Mathematics 数学-数学

CiteScore

2.90

自引率

6.20%

发文量

审稿时长

>12 weeks

期刊介绍： With traditional boundaries between various specialized fields of mathematics becoming less and less visible, Communications in Contemporary Mathematics (CCM) presents the forefront of research in the fields of: Algebra, Analysis, Applied Mathematics, Dynamical Systems, Geometry, Mathematical Physics, Number Theory, Partial Differential Equations and Topology, among others. It provides a forum to stimulate interactions between different areas. Both original research papers and expository articles will be published.