Solutions of evolutionary equation based on the anisotropic variable exponent Sobolev space

The norm in classical Sobolev spaces can be expressed as a difference quotient. This expression can be used to generalize the space to the fractional smoothness case. Since the difference quotient is based on shifting the function, it cannot be generalized to the variable exponent case. In its place, we introduce a smoothed difference quotient and show that it can be used to characterize the variable exponent Sobolev space.

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The Existence of Solutions to the NonhomogeneousA-Harmonic Equations with Variable Exponent

Abstract and Applied Analysis ◽

10.1155/2014/280214 ◽

2014 ◽

Vol 2014 ◽

pp. 1-6

Author(s):

Haiyu Wen

Keyword(s):

Weak Solution ◽

Sobolev Space ◽

Existence And Uniqueness ◽

Obstacle Problem ◽

Variable Exponent ◽

Existence Of Solutions ◽

Variable Exponent Sobolev Space ◽

Harmonic Equation ◽

Weighted Variable

We first discuss the existence and uniqueness of weak solution for the obstacle problem of the nonhomogeneousA-harmonic equation with variable exponent, and then we obtain the existence of the solutions of the equationd⋆A(x,dω)=B(x,dω)in the weighted variable exponent Sobolev spaceWdp(x)(Ω,Λl,μ).

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On the density of continuous functions in variable exponent Sobolev space

Revista Matemática Iberoamericana ◽

10.4171/rmi/492 ◽

2007 ◽

pp. 213-234 ◽

Cited By ~ 3

Author(s):

Peter Hästö

Keyword(s):

Sobolev Space ◽

Variable Exponent ◽

Continuous Functions ◽

Variable Exponent Sobolev Space

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Three solutions to a p(x)-Laplacian problem in weighted-variable-exponent Sobolev space

Analele Universitatii Ovidius Constanta - Seria Matematica ◽

10.2478/auom-2013-0033 ◽

2013 ◽

Vol 21 (2) ◽

pp. 195-205 ◽

Cited By ~ 1

Author(s):

Wen-Wu Pan ◽

Ghasem Alizadeh Afrouzi ◽

Lin Li

Keyword(s):

Sobolev Space ◽

Neumann Problem ◽

Weak Solutions ◽

Elliptic Equations ◽

Variable Exponent ◽

Three Solutions ◽

Variable Exponent Sobolev Space ◽

Weighted Variable

Abstract In this paper, we verify that a general p(x)-Laplacian Neumann problem has at least three weak solutions, which generalizes the corresponding result of the reference [R. A. Mashiyev, Three Solutions to a Neumann Problem for Elliptic Equations with Variable Exponent, Arab. J. Sci. Eng. 36 (2011) 1559-1567].

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Generalization of Poincar ´e inequality in a Sobolev Space with exponent constant to the case of Sobolev space with a variable exponent

General Letters in Mathematics ◽

10.31559/glm2021.10.2.3 ◽

2021 ◽

Vol 10 (2) ◽

pp. 31-37

Author(s):

Moulay Rchid Sidi Ammi ◽

Ibrahim Dahi

Keyword(s):

Sobolev Space ◽

Sobolev Spaces ◽

Variable Exponent ◽

Poincaré Inequality ◽

Poincare Inequality ◽

Equivalent Norms

In this work, we study the Poincare inequality in Sobolev spaces with variable exponent. As a consequence of this ´ result we show the equivalent norms over such cones. The approach we adopt in this work avoids the difficulty arising from the possible lack of density of the space C∞ 0 (Ω).

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Characterization of generalized Orlicz spaces

Communications in Contemporary Mathematics ◽

10.1142/s0219199718500797 ◽

2018 ◽

Vol 22 (02) ◽

pp. 1850079 ◽

Cited By ~ 2

Author(s):

Rita Ferreira ◽

Peter Hästö ◽

Ana Margarida Ribeiro

Keyword(s):

Sobolev Space ◽

Sobolev Spaces ◽

Variable Exponent ◽

Orlicz Spaces ◽

Difference Quotient ◽

Variable Exponent Spaces ◽

The Difference ◽

Fractional Smoothness

The norm in classical Sobolev spaces can be expressed as a difference quotient. This expression can be used to generalize the space to the fractional smoothness case. Because the difference quotient is based on shifting the function, it cannot be used in generalized Orlicz spaces. In its place, we introduce a smoothed difference quotient and show that it can be used to characterize the generalized Orlicz–Sobolev space. Our results are new even in Orlicz spaces and variable exponent spaces.

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On a new fractional Sobolev space and applications to nonlocal variational problems with variable exponent

Discrete & Continuous Dynamical Systems - S ◽

10.3934/dcdss.2018021 ◽

2018 ◽

Vol 11 (3) ◽

pp. 379-389 ◽

Cited By ~ 19

Author(s):

Anouar Bahrouni ◽

◽

VicenŢiu D. RĂdulescu ◽

◽

Keyword(s):

Sobolev Space ◽

Variable Exponent ◽

Variational Problems ◽

Fractional Sobolev Space

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GEOMETRY OF SOBOLEV SPACES WITH VARIABLE EXPONENT AND A GENERALIZATION OF THE p-LAPLACIAN

Analysis and Applications ◽

10.1142/s0219530509001451 ◽

2009 ◽

Vol 07 (04) ◽

pp. 373-390 ◽

Cited By ~ 5

Author(s):

GEORGE DINCA ◽

PAVEL MATEI

Keyword(s):

Sobolev Space ◽

Bounded Domain ◽

Sobolev Spaces ◽

Lebesgue Space ◽

Variable Exponent ◽

Uniformly Convex ◽

Smooth Bounded Domain ◽

Generalized Lebesgue Space

Let Ω ⊂ ℝN, N ≥ 2, be a smooth bounded domain. It is shown that: (a) if [Formula: see text] and ess inf x ∈ y p(x) > 1, then the generalized Lebesgue space (Lp (·)(Ω), ‖·‖p(·)) is smooth; (b) if [Formula: see text] and p(x) > 1, [Formula: see text], then the generalized Sobolev space [Formula: see text] is smooth. In both situations, the formulae for the Gâteaux gradient of the norm corresponding to each of the above spaces are given; (c) if [Formula: see text] and p(x) ≥ 2, [Formula: see text], then [Formula: see text] is uniformly convex and smooth.

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On compact and bounded embedding in variable exponent Sobolev spaces and its applications

Arabian Journal of Mathematics ◽

10.1007/s40065-019-00268-8 ◽

2019 ◽

Vol 9 (2) ◽

pp. 401-414

Author(s):

Farman Mamedov ◽

Sayali Mammadli ◽

Yashar Shukurov

Keyword(s):

Sobolev Space ◽

Growth Condition ◽

Sobolev Spaces ◽

Variable Exponent ◽

Lebesgue Spaces ◽

Nonstandard Growth ◽

Variable Exponent Sobolev Spaces ◽

Nonstandard Growth Condition ◽

Nonlinear Ode ◽

Weighted Variable

Abstract For a weighted variable exponent Sobolev space, the compact and bounded embedding results are proved. For that, new boundedness and compact action properties are established for Hardy’s operator and its conjugate in weighted variable exponent Lebesgue spaces. Furthermore, the obtained results are applied to the existence of positive eigenfunctions for a concrete class of nonlinear ode with nonstandard growth condition.

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Sobolev capacity on the spaceW1, p(⋅)(ℝn)

Journal of Function Spaces and Applications ◽

10.1155/2003/895261 ◽

2003 ◽

Vol 1 (1) ◽

pp. 17-33 ◽

Cited By ~ 31

Author(s):

Petteri Harjulehto ◽

Peter Hästö ◽

Mika Koskenoja ◽

Susanna Varonen

Keyword(s):

Hausdorff Dimension ◽

Sobolev Space ◽

Variable Exponent ◽

Choquet Capacity ◽

Sobolev Capacity

We define Sobolev capacity on the generalized Sobolev spaceW1, p(⋅)(ℝn). It is a Choquet capacity provided that the variable exponentp:ℝn→[1,∞)is bounded away from 1 and∞. We discuss the relation between the Hausdorff dimension and the Sobolev capacity. As another application we study quasicontinuous representatives in the spaceW1, p(⋅)(ℝn).

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