一类障碍问题的Lipschitz连续性结果

IF 0.6 4区数学 Q3 MATHEMATICS

Rendiconti Lincei-Matematica e Applicazioni Pub Date : 2020-04-03 DOI:10.4171/rlm/885

Carlo Benassi, Michele Caselli

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引用次数: 6

摘要

.我们证明了一类障碍问题在p−型，p≥2的标准增长条件下解的Lipschitz连续性结果。主要的新颖性是使用了可以追溯到[28]的线性化技术，以便将我们的约束最小化器解释为具有有界右手边的非线性椭圆方程的解。这使我们开始了一个Moser迭代方案，该方案提供了梯度的L∞界。最近更高差异性结果[24]的应用使我们能够简化[32]中采用的线性化技术中氡测量的识别过程。据我们所知，这是在Lipschitz正则性方向上具有标准增长条件的非自同构泛函的第一个结果。

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Lipschitz continuity results for a class of obstacle problems

. We prove Lipschitz continuity results for solutions to a class of obstacle problems under standard growth conditions of p − type, p ≥ 2. The main novelty is the use of a linearization technique going back to [28] in order to interpret our constrained minimizer as a solution to a nonlinear elliptic equation, with a bounded right hand side. This lead us to start a Moser iteration scheme which provides the L ∞ bound for the gradient. The application of a recent higher diﬀerentiability result [24] allows us to simplify the procedure of the identiﬁcation of the Radon measure in the linearization technique employed in [32]. To our knowdledge, this is the ﬁrst result for non-automonous functionals with standard growth conditions in the direction of the Lipschitz regularity.

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来源期刊

Rendiconti Lincei-Matematica e Applicazioni MATHEMATICS, APPLIED-MATHEMATICS

CiteScore

1.30

自引率

0.00%

发文量

审稿时长

>12 weeks

期刊介绍： The journal is dedicated to the publication of high-quality peer-reviewed surveys, research papers and preliminary announcements of important results from all fields of mathematics and its applications.