On grand and small Lebesgue and Sobolev spaces and some applications to PDE's

A. Fiorenza, M. R. Formica, Amiran Gogatishvili
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引用次数: 59

Abstract

This paper is essentially a survey on grand and small Lebesgue spaces, which are rearrangement-invariant Banach function spaces of interest not only from the point of view of Function Spaces theory, but also from the point of view of their applications: the corresponding Sobolev spaces are of interest, for instance, in the theory of PDEs. We discuss results of existence, uniqueness and regularity of certain Dirichlet problems, where the knowledge of these spaces plays a central role. The novelty of this paper relies in an unified treatment containing a number of equivalent quasinorms, all written making explicit the dependence of |Ω| , in the discussion of the sharpness of Hölder’s inequality, and in the connection of the results in PDEs with some existing literature. 1. Grand and small Lebesgue spaces: a short overview 1.1. The original motivation Let Ω ⊂ Rn be a bounded domain and f : Ω →Rn , f = ( f 1, ..., f n) be a mapping of Sobolev class W 1,n loc (Ω,R n) . Let us denote by Df (x) : Rn → Rn the differential and by J(x, f ) = detD f (x) the Jacobian of f . After the elementary remark that by Hölder’s inequality the Jacobian J(x, f ) is in Lloc(Ω) , the first fundamental result on the integrability of the Jacobian was due to Müller ([135]): f ∈W (Ω,R), J(x, f ) 0 a.e. ⇒ J(x, f ) ∈ L logLloc(Ω). Mathematics subject classification (2010): 46E30, 35J65.
论大小Lebesgue和Sobolev空间及其在PDE中的应用
本文不仅从函数空间理论的角度,而且从其应用的角度对大小勒贝格空间进行了综述,这些空间是重排不变的Banach函数空间,其相应的Sobolev空间在偏微分方程理论中具有重要意义。讨论了一类Dirichlet问题的存在性、唯一性和正则性的结果,其中这些空间的知识起着中心作用。本文的新颖之处在于,它采用了统一的处理方法,其中包含了若干等价的拟规范,这些拟规范都明确了|Ω|的依赖性,它讨论了Hölder不等式的尖锐性,并将偏微分方程的结果与一些现有文献联系起来。1. 勒贝格空间的大小:简要概述设Ω∧Rn为有界域,f: Ω→Rn, f = (f1,…), f n)是Sobolev类w1,n loc (Ω,R n)的映射。我们用Df (x)表示Rn→Rn微分用J(x, f) = detD f (x)表示f的雅可比矩阵。在通过Hölder不等式证明雅可比矩阵J(x, f)在Lloc(Ω)中之后,关于雅可比矩阵可积性的第一个基本结果是由m([135])得出的:f∈W (Ω,R), J(x, f) 0 a.e.⇒J(x, f)∈lloglloc (Ω)。数学学科分类(2010):46E30, 35J65。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
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