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An estimate for the composition of rough singular integral operators

Published online by Cambridge University Press:  07 December 2020

Xiangxing Tao
Affiliation:
Department of Mathematics, School of Science, Zhejiang University of Science and Technology, Hangzhou310023, P.R. Chinae-mail:[email protected]
Guoen Hu*
Affiliation:
School of Applied Mathematics, Beijing Normal University, Zhuhai519087, P.R. China

Abstract

Let $\Omega $ be homogeneous of degree zero and have mean value zero on the unit sphere ${S}^{d-1}$ , $T_{\Omega }$ be the convolution singular integral operator with kernel $\frac {\Omega (x)}{|x|^d}$ . In this paper, we prove that if $\Omega \in L\log L(S^{d-1})$ , and U is an operator which is bounded on $L^2(\mathbb {R}^d)$ and satisfies the weak type endpoint estimate of $L(\log L)^{\beta }$ type, then the composition operator $UT_{\Omega }$ satisfies a weak type endpoint estimate of $L(\log L)^{\beta +1}$ type.

Type
Article
Copyright
© Canadian Mathematical Society 2020

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Footnotes

The research of X.T was supported by the NNSF of China under grant #11771399, and the research of G.H. (corresponding author) was supported by the NNSF of China under grant #11871108.

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