二维赋范空间中aml函数的正则性

Pub Date : 2022-05-20 DOI:10.1017/S1446788722000088
Sebastián Tapia-García
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引用次数: 0

摘要

Savin [' $\mathcal {C}^{1}$二维无穷调和函数的正则性',Arch。配给。动力机械。Anal. 3(176)(2005), 351-361]证明了任何平面绝对最小化Lipschitz (AML)函数在环境空间为欧几里得时都是连续可微的。最近,Peng等人[连续凸哈密顿量的绝对极小值的规律性],J.微分方程274(2021),1115-1164]使用一些欧氏技术证明了这一性质对于平面AML函数对于某些凸哈密顿量仍然成立。其结果可应用于二维范数可微的赋范空间中定义的AML函数。在此工作中,我们发展了一种纯非欧几里德技术来获得平面AML函数在二维范数可微的赋范空间中的正则性。
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REGULARITY OF AML FUNCTIONS IN TWO-DIMENSIONAL NORMED SPACES
Abstract Savin [‘ $\mathcal {C}^{1}$ regularity for infinity harmonic functions in two dimensions’, Arch. Ration. Mech. Anal. 3(176) (2005), 351–361] proved that every planar absolutely minimizing Lipschitz (AML) function is continuously differentiable whenever the ambient space is Euclidean. More recently, Peng et al. [‘Regularity of absolute minimizers for continuous convex Hamiltonians’, J. Differential Equations 274 (2021), 1115–1164] proved that this property remains true for planar AML functions for certain convex Hamiltonians, using some Euclidean techniques. Their result can be applied to AML functions defined in two-dimensional normed spaces with differentiable norm. In this work we develop a purely non-Euclidean technique to obtain the regularity of planar AML functions in two-dimensional normed spaces with differentiable norm.
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