Examples of 'sobolev spaces' in a sentence
Meaning of "sobolev spaces"
sobolev spaces - a concept in functional analysis and partial differential equations
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- plural of Sobolev space
How to use "sobolev spaces" in a sentence
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sobolev spaces
Sobolev spaces are often considered when investigating partial differential equations.
Polynomial approximation of functions in Sobolev spaces.
Some other Sobolev spaces permit a simpler description.
This statement can be proved using Sobolev spaces.
It is rather hard to work with Sobolev spaces relying only on their definition.
Existence and uniqueness results are given in weighted Sobolev spaces.
Sobolev spaces and Distributions.
Recap of basic results on Sobolev spaces.
Sobolev spaces are named after the Russian mathematician Sergei Sobolev.
These spaces are a natural generalization to the usual fractional Sobolev spaces.
Functional analysis, sobolev spaces and applications.
Our analysis starts from elliptic regularity in non homogeneous weighted Sobolev spaces.
Sobolev spaces are studied first, providing definitions and basic results of this theory.
We also establish the corresponding statement in the setting of higher order Sobolev spaces.
Abstract, Sobolev spaces are inherent to the theory of PDEs.
See also
The motivation for our result comes from a new characterization of the Sobolev spaces.
The standard Sobolev spaces provides, in this case, an adequate functional framework for a complete study.
First properties of Sobolev spaces.
Sobolev spaces in mathematics II, Applications in analysis and partial differential equations.
Summability of functions in Sobolev spaces.
Sobolev spaces can also be defined when " s " is not an integer.
I have a question about Sobolev Spaces.
With this definition, the Sobolev spaces admit a natural norm,:formula 8Equipped with the norm, becomes a Banach space.
In this case the original operator I defines a Fredholm operator between the Sobolev spaces.
Category, Sobolev spaces.
We derive sharp trudinger¿moser type inequalities for weighted sobolev spaces.
Other examples = = = = Some other Sobolev spaces permit a simpler description.
In mathematics, the Rellich-Kondrachov theorem is a compact embedding theorem concerning Sobolev spaces.
In each case, we obtain local well-posedness results in sobolev spaces with low regularity.
The Eberlein-Šmulian theorem is important in the theory of PDEs, and particularly in Sobolev spaces.
Abstract, In this Thesis, we study the real interpolation of Sobolev spaces and its applications.
For that, we consider data and give solutions which live in weighted Sobolev spaces.
This enables the formulation of solutions on spaces with well-characterized properties, such as Sobolev spaces.
Harmonic analysis, the Fourier transform and Sobolev spaces.
Title: On the interpolation of weighted Sobolev spaces.
This work addresses a class of trudinger-moser type inequalities in weighted sobolev spaces in $ r ^ 2.
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The interior spaces are rich and varied
Spaces and digits take first priority
But let there be spaces in your togetherness
