Maximal functions for Weinstein operator

Chokri Abdelkefi

Displaying similar documents to “Maximal functions for Weinstein operator”

Necessary and sufficient conditions for the boundedness of Dunkl-type fractional maximal operator in the Dunkl-type Morrey spaces.

Guliyev, Emin, Eroglu, Ahmet, Mammadov, Yagub (2010)

Abstract and Applied Analysis

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Dunkl translation and uncentered maximal operator on the real line.

Abdelkefi, Chokri, Sifi, Mohamed (2007)

International Journal of Mathematics and Mathematical Sciences

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Corrections to “The maximal function on variable $L^{p}$ spaces".

Cruz-Uribe, D., Fiorenza, A., Neugebauer, C.J. (2004)

Annales Academiae Scientiarum Fennicae. Mathematica

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Boundedness of Hardy-Littlewood maximal operator on block spaces with variable exponent

Ka Luen Cheung, Kwok-Pun Ho (2014)

Czechoslovak Mathematical Journal

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The family of block spaces with variable exponents is introduced. We obtain some fundamental properties of the family of block spaces with variable exponents. They are Banach lattices and they are generalizations of the Lebesgue spaces with variable exponents. Moreover, the block space with variable exponents is a pre-dual of the corresponding Morrey space with variable exponents. The main result of this paper is on the boundedness of the Hardy-Littlewood maximal operator on the block...

Maximal regularity for flexible structural systems in Lebesgue spaces.

Fernández, Claudio, Lizama, Carlos, Poblete, Verónica (2010)

Mathematical Problems in Engineering

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Stability for non-autonomous linear evolution equations with $L^{p}$ -maximal regularity

Hafida Laasri, Omar El-Mennaoui (2013)

Czechoslovak Mathematical Journal

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We study stability and integrability of linear non-autonomous evolutionary Cauchy-problem $(P) \{\begin{matrix} \dot{u} (t) + A (t) u (t) = f (t) t -a.e. on [0, τ], u (0) = 0, \end{matrix}$ where $A : [0, τ] \to ℒ (X, D)$ is a bounded and strongly measurable function and $X$ , $D$ are Banach spaces such that $D \underset{d}{\to} ↪ X$ . Our main concern is to characterize $L^{p}$ -maximal regularity and to give an explicit approximation of the problem (P).

Some embeddings into the Morrey and modified Morrey spaces associated with the Dunkl operator.

Guliyev, Emin V., Mammadov, Yagub Y. (2010)

Abstract and Applied Analysis

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On weak type inequalities for rare maximal functions in ℝⁿ

A. M. Stokolos (2006)

Colloquium Mathematicae

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The study of one-dimensional rare maximal functions was started in [4,5]. The main result in [5] was obtained with the help of some general procedure. The goal of the present article is to adapt the procedure (we call it "dyadic crystallization") to the multidimensional setting and to demonstrate that rare maximal functions have properties not better than the Strong Maximal Function.

Some remarks on Kato's inequality.

Horiuchi, Toshio (2001)

Journal of Inequalities and Applications [electronic only]

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