非线性积分微分方程的半凸性估计

IF 3.1 1区 数学 Q1 MATHEMATICS
Xavier Ros‐Oton, Clara Torres‐Latorre, Marvin Weidner
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引用次数: 0

摘要

在本文中,我们首次建立了全非线性方程和由具有一般核的整微分算子驱动的障碍问题的局部半凸性估计。我们的证明基于伯恩斯坦技术,该技术是为一类自然的非局部算子开发的,并被认为具有独立的意义。特别是,我们解决了卡布雷-迪皮耶罗-瓦尔迪诺奇的一个未决问题。作为我们结果的应用,我们为域上的非局部障碍问题建立了最优正则性估计和正则点附近自由边界的平滑性。最后,我们还将伯恩斯坦技术扩展到抛物方程和非对称算子。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
Semiconvexity estimates for nonlinear integro‐differential equations
In this paper we establish for the first time local semiconvexity estimates for fully nonlinear equations and for obstacle problems driven by integro‐differential operators with general kernels. Our proof is based on the Bernstein technique, which we develop for a natural class of nonlocal operators and consider to be of independent interest. In particular, we solve an open problem from Cabré‐Dipierro‐Valdinoci. As an application of our result, we establish optimal regularity estimates and smoothness of the free boundary near regular points for the nonlocal obstacle problem on domains. Finally, we also extend the Bernstein technique to parabolic equations and nonsymmetric operators.
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来源期刊
CiteScore
6.70
自引率
3.30%
发文量
59
审稿时长
>12 weeks
期刊介绍: Communications on Pure and Applied Mathematics (ISSN 0010-3640) is published monthly, one volume per year, by John Wiley & Sons, Inc. © 2019. The journal primarily publishes papers originating at or solicited by the Courant Institute of Mathematical Sciences. It features recent developments in applied mathematics, mathematical physics, and mathematical analysis. The topics include partial differential equations, computer science, and applied mathematics. CPAM is devoted to mathematical contributions to the sciences; both theoretical and applied papers, of original or expository type, are included.
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