Lipschitz domain:Smooth approximation of Lipschitz domains
Smooth approximation of Lipschitz domains
由CAAntonini著作·2024·被引用3次—WeprovideanovelapproachtoapproximateboundedLipschitzdomainsviaasequenceofsmooth,boundeddomains.Theflexibilityofour ...。其他文章還包含有:「Lipschitzdomain」、「UnderstandingLipschitzdomain」、「LipschitzDomain」、「Lipschitzdomainsambiguousdefinitions」、「AreopenballsLipschitzdomainin$mathbbR}^n」、「GeometricandtransformationalpropertiesofLipschitz...」、「ge...
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In mathematics, a Lipschitz domain is a domain in Euclidean space whose boundary is sufficiently regular in the sense that it can be thought of as locally ...
Understanding Lipschitz domain
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A Lipschitz domain (or domain with Lipschitz boundary) is a domain in Euclidean space whose boundary is sufficiently regular.
Lipschitz Domain
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Let Ω be a bounded Lipschitz domain in R n . Then there exists a constant c = c(Ω) depending only on Ω, such that (6.12) | σ | L 2 ( Ω ) ⩽ c ( Ω
Lipschitz domains ambiguous definitions
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The boundary ∂Ω of an open set Ω⊂RN is locally Lipschitz if for each x0∈∂Ω there exist a neighborhood A of x0, local coordinates y=(y′,yN)∈ ...
Are open balls Lipschitz domain in $mathbbR}^n
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My teacher said that a bounded Lipschitz domain is a domain whose boundary is the graph of a Lipschitz function. I really don't understand the meaning of that ...
Geometric and transformational properties of Lipschitz ...
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Lipschitz domain. 17. Definition 2.3. A nonempty, bounded open subset Ωof Rnis called a bounded C1-domain if it is. a strongly Lipschitz domain and the ...
geometric measure theory
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It is a classical result that a Lipschitz domain is such an extension domain, e.g. Theorem 1.4.3.1 in Grisvard [2]. [1] ...
Boundary Layer Methods for Lipschitz Domains in ...
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We treat the Laplace operator on Lipschitz domains in a manifold withC1metric tensor and study the Dirichlet, Neumann, and oblique derivative boundary problems.
The Dirichlet problem for the Laplacian in Lipschitz domain ...
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The main purpose of this paper is to address some questions concerning boundary value problems related to the Laplacian and bi-Laplacian operators.