Pointwise inequalities for Sobolev functions and some applications

Bogdan Bojarski; Piotr Hajłasz

Displaying similar documents to “Pointwise inequalities for Sobolev functions and some applications”

Hölder quasicontinuity of Sobolev functions on metric spaces.

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Revista Matemática Iberoamericana

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We prove that every Sobolev function defined on a metric space coincides with a Hölder continuous function outside a set of small Hausdorff content or capacity. Moreover, the Hölder continuous function can be chosen so that it approximates the given function in the Sobolev norm. This is a generalization of a result of Malý [Ma1] to the Sobolev spaces on metric spaces [H1].

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In a recent article the authors showed that it is possible to define a Sobolev capacity in variable exponent Sobolev space. However, this set function was shown to be a Choquet capacity only under certain assumptions on the variable exponent. In this article we relax these assumptions.

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Weighted Sobolev spaces and capacity.

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Sobolev embeddings with variable exponent

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Polynomial asymptotics and approximation of Sobolev functions

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Studia Mathematica

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We prove several results concerning density of $C_{0}^{\infty}$ , behaviour at infinity and integral representations for elements of the space $L^{m, p} = ⨍ | \nabla^{m} ⨍ \in L^{p}$ .

From the Prékopa-Leindler inequality to modified logarithmic Sobolev inequality

Ivan Gentil (2008)

Annales de la faculté des sciences de Toulouse Mathématiques

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We develop in this paper an improvement of the method given by S. Bobkov and M. Ledoux in [BL00]. Using the Prékopa-Leindler inequality, we prove a modified logarithmic Sobolev inequality adapted for all measures on $ℝ^{n}$ , with a strictly convex and super-linear potential. This inequality implies modified logarithmic Sobolev inequality, developed in [GGM05, GGM07], for all uniformly strictly convex potential as well as the Euclidean logarithmic Sobolev inequality.

Logarithmic Sobolev inequalities for unbounded spin systems revisited

Michel Ledoux (2001)

Séminaire de probabilités de Strasbourg

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Poincaré inequalities and Sobolev spaces.

Paul MacManus (2002)

Publicacions Matemàtiques

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Our understanding of the interplay between Poincaré inequalities, Sobolev inequalities and the geometry of the underlying space has changed considerably in recent years. These changes have simultaneously provided new insights into the classical theory and allowed much of that theory to be extended to a wide variety of different settings. This paper reviews some of these new results and techniques and concludes with an example on the preservation of Sobolev spaces by the maximal function. ...