Your search keyword '"42B25, 42B35, 46E30"' showing total 3 results

1. Carleson measure spaces with variable exponents and their applications

Author

Tan, Jian

Subjects

Mathematics - Classical Analysis and ODEs, 42B25, 42B35, 46E30

Abstract

In this paper, we introduce the Carleson measure spaces with variable exponents $CMO^{p(\cdot)}$. By using discrete Littlewood$-$Paley$-$Stein analysis as well as Frazier and Jawerth's $\varphi-$transform in the variable exponent settings, we show that the dual space of the variable Hardy space $H^{p(\cdot)}$ is $CMO^{p(\cdot)}$. As applications, we obtain that Carleson measure spaces with variable exponents $CMO^{p(\cdot)}$, Campanato space with variable exponent $\mathfrak{L}_{q,p(\cdot),d}$ and H\"older-Zygmund spaces with variable exponents $\mathcal {\dot{H}}_d^{p(\cdot)}$ coincide as sets and the corresponding norms are equivalent. Via using an argument of weak density property, we also prove the boundedness of Calder\'{o}n-Zygmund singular integral operator acting on $CMO^{p(\cdot)}$., Comment: 26 pages, submit to a journal on 02 Dec 2018

Published

2019

2. An extension of Muchenhoupt-Wheeden theorem to generalized weighted (central) Morrey spaces

Author

Mustafayev, Rza and Kucukaslan, Abdulhamit

Subjects

Mathematics - Functional Analysis, 42B25, 42B35, 46E30

Abstract

In this paper we find the condition on function $\omega$ and weight $v$ which ensures the equivalency of norms of the Riesz potential and the fractional maximal function in generalized weighted Morrey spaces ${\mathcal M}_{p,\omega}({\mathbb R}^n,v)$ and generalized weighted central Morrey spaces $\dot{\mathcal M}_{p,\omega}({\mathbb R}^n,v)$, when $v$ belongs to Muckenhoupt $A_{\infty}$-class., Comment: 18 pages

Published

2018

3. Carleson measure spaces with variable exponents and their applications

Author

Jian Tan

Subjects

Mathematics::Functional Analysis, Algebra and Number Theory, Variable exponent, 010102 general mathematics, Mathematics::Classical Analysis and ODEs, Hardy space, Space (mathematics), 01 natural sciences, Density property, Combinatorics, Carleson measure, symbols.namesake, Mathematics - Classical Analysis and ODEs, Bounded function, 0103 physical sciences, symbols, Classical Analysis and ODEs (math.CA), FOS: Mathematics, 010307 mathematical physics, 42B25, 42B35, 46E30, 0101 mathematics, Singular integral operators, Analysis, Mathematics, Variable (mathematics)

Abstract

In this paper, we introduce the Carleson measure spaces with variable exponents $CMO^{p(\cdot)}$. By using discrete Littlewood$-$Paley$-$Stein analysis as well as Frazier and Jawerth's $\varphi-$transform in the variable exponent settings, we show that the dual space of the variable Hardy space $H^{p(\cdot)}$ is $CMO^{p(\cdot)}$. As applications, we obtain that Carleson measure spaces with variable exponents $CMO^{p(\cdot)}$, Campanato space with variable exponent $\mathfrak{L}_{q,p(\cdot),d}$ and H\"older-Zygmund spaces with variable exponents $\mathcal {\dot{H}}_d^{p(\cdot)}$ coincide as sets and the corresponding norms are equivalent. Via using an argument of weak density property, we also prove the boundedness of Calder\'{o}n-Zygmund singular integral operator acting on $CMO^{p(\cdot)}$., Comment: 26 pages, submit to a journal on 02 Dec 2018

Published

2019