Results 241 to 250 of about 75,467 (278)

Carleson Measures for Variable Exponent Bergman Spaces

Complex Analysis and Operator Theory, 2016
Let \(A^p(\mathbb{D})\), \(0< p
Gerardo R Chacón, Humberto Rafeiro
exaly   +3 more sources

Variable exponent Bergman spaces

Nonlinear Analysis: Theory, Methods & Applications, 2014
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Gerardo R. Chacón, Humberto Rafeiro
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Grand Herz–Morrey Spaces with Variable Exponent

Mathematical Notes, 2023
zbMATH Open Web Interface contents unavailable due to conflicting licenses.
Sultan, M., Sultan, B., Hussain, A.
openaire   +1 more source

Embeddings in Grand Variable Exponent Function Spaces

Results in Mathematics, 2021
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David E. Edmunds, Vakhtang Kokilashvili, Alexander Meskhi   +2 more
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Variable exponent Campanato spaces

Journal of Mathematical Sciences, 2010
Let \((X,d,\mu)\) be a quasimetric measure space with distance function \(d\) satisfying the quasitriangle inequality \(d(x,y) 0\). If \(p\) is a measurable function on \(X\) with \(p_-=\text{ess\,inf}\{p(x)\}\), \(p_+= \text{ess\,sup}\{p(x)\}\), such that \(1\leq p_-\leq p(.)\leq p_+< \infty\), let \(I^{p(.)}(f/\lambda)\) and \(\| f\|_{p(.)}\) be ...
Rafeiro, H., Samko, S.
openaire   +1 more source

Variable Exponent Lebesgue Spaces

2011
In this chapter we define Lebesgue spaces with variable exponents, \(L^{p(.)}\). They differ from classical \(L^p\) spaces in that the exponent p is not constant but a function from Ω to \([1,\infty]\). The spaces \(L^{p(.)}\) fit into the framework of Musielak–Orlicz spaces and are therefore also semimodular spaces.
Lars Diening, Petteri Harjulehto, Peter Hästö, Michael Růžička   +3 more
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HARDY-AMALGAM SPACES WITH VARIABLE EXPONENTS AND THEIR DUALS

Universal Journal of Mathematics and Mathematical Sciences, 2022
Summary: We introduce some new spaces termed as Hardy-amalgam spaces with variable exponents denoted \(\mathcal{H}^{p(\cdot),q}\) (\(q>1\)). These spaces are defined via the maximal function characterization on the Euclidean space \(\mathbb{R}^d\), by replacing Lebesgue quasi-norms by Wiener amalgam ones. We then investigate their dual spaces.
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Variable Exponent Hölder Spaces

2016
We already dealt in Volume 1 with Holder spaces Hλ(·)(Ω) of variable order, in Sections 8.2.1 and 8.2.3 in the case of open sets \( \Omega \subseteq \mathbb{R}^n \), and in Section 8.3 in the general case of quasimetric measure spaces, where embeddings of variable exponent Sobolev spaces into Holder spaces were established.
Vakhtang Kokilashvili, Alexander Meskhi, Humberto Rafeiro, Stefan Samko   +3 more
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Hardy Spaces with Variable Exponents

2019
In this paper, we make a survey on some recent developments of the theory of Hardy spaces with variable exponents in different settings.
Almeida, Víctor, Betancor, Jorge, Dalmasso, Estefanía Dafne, Rodríguez Mesa, Lourdes   +3 more
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Two Weighted Herz Spaces with Variable Exponents

Bulletin of the Malaysian Mathematical Sciences Society, 2018
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Izuki, Mitsuo, Noi, Takahiro
openaire   +2 more sources