哈纳克不等式
哈纳克原理
数学
无穷小
均质化(气候)
二次方程
新颖性
不平等
比例(比率)
应用数学
纯数学
数学分析
几何学
物理
生物
量子力学
生物多样性
哲学
神学
生态学
作者
Daniela De Silva,Ovidiu Savin
标识
DOI:10.1353/ajm.2021.0001
摘要
In this paper we obtain some extensions of the classical Krylov-Safonov Harnack inequality. The novelty is that we consider functions that do not necessarily satisfy an infinitesimal equation but rather exhibit a two-scale behavior. We require that at scale larger than some $r_0>0$ (small) the functions satisfy the comparison principle with a standard family of quadratic polynomials, while at scale $r_0$ they satisfy a Weak Harnack type estimate. We also give several applications of the main result in very different settings such as discrete difference equations, nonlocal equations, homogenization and the quasi-minimal surfaces of Almgren.
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