Regularity for nonlinear elliptic equations and systems

IF 0.6 Q3 MULTIDISCIPLINARY SCIENCES
Paolo Marcellini
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引用次数: 1

Abstract

We study the regularity of weak solutions to the elliptic system in divergence form divA( x , D u)=0 in an open set Ω of R n , n ≥2. The vector field A( x .ξ), A: Ω×R m×n →R m×n , has a variational nature in the sense that A( x ,ξ)= D ξ f ( x ,ξ), where f :Ω×R m×n →R is a convex Caratheodory integrand ; i.e., f = f ( x ,ξ) is measurable with respect to x ∈R n and it is a convex function with respect to ξ∈R m×n . If m =1 then the system reduces to a partial differential equation . In the context m >1 of general vector-valued maps and systems , a classical assumption finalized to the everywhere regularity of the weak solutions is a modulus-dependence in the energy integrand; i.e., we require that f ( x ,ξ)= g ( x ,|ξ|), where g :Ω×[0,∞)→[0,∞) is measurable with respect to x∈  R n and it is a convex and increasing function with respect to the gradient variable t∈[0,∞).
非线性椭圆型方程和系统的正则性
研究了发散形式为divA(x,DU)=0的椭圆系统在Rn,n≥2的开集Ω中弱解的正则性。向量场A(x.ξ),A:Ω×Rm×n→Rm×n,在a(x,ξ)=Dξf(x,ζ)的意义上具有变分性质,其中f:Ω×Rm×→R是凸Caratheodory被积函数;即,f=f(x,ξ)关于x∈Rn是可测量的,并且它是关于ξ∈Rm×n的凸函数。如果m=1,则系统简化为偏微分方程。在一般向量值映射和系统的m>1的情况下,对弱解的处处正则性的经典假设是能量被积函数中的模依赖性;即,我们要求f(x,ξ)=g(x,|ξ|),其中g:Ω×[0,∞)→[0,∞)关于x∈Rn是可测量的,并且它是关于梯度变量t∈[0,H_。
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来源期刊
CiteScore
3.80
自引率
0.00%
发文量
0
审稿时长
31 weeks
期刊介绍: This journal is of a multi- and inter-disciplinary nature and covers a broad range of fields including mathematics, computer science, physics, chemistry, biology, earth sciences, and their intersection. History of science is also included within the topics addressed by the journal. The transactions of the Pelorian Academy started out as periodic news sheets containing the notes presented by the members of the Divisions into which the Academy has been and still is organized, according to subject areas. The publication of these notes for the Division (“Classe”) of Mathematical, Physical and Natural Sciences is the responsibility of the Editorial Committee, which is composed of the Director of the division with the role of Chairman, the Vice-Director, the Secretary and two or more other members. Besides original research articles, the journal also accepts texts from conferences and invited talks held in the Academy. These contributions are published in a different section of the journal. In addition to the regular issues, single monographic supplements are occasionally published which assemble reports and communications presented at congresses, symposia, seminars, study meetings and other scientific events organized by the Academy or under its patronage. Since 2004 these transactions have been published online in the form of an open access electronic journal.
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