CBMO estimates for commutators and multilinear singular integrals

## Abstract Let __T__ be a Calderón–Zygmund operator with regular kernel __K__ and __T__ \*~__b__~ be the maximal multilinear commutator defined by equation image . In this paper, the following weighted estimates for __T__ \*~__b__~ are discussed. Precisely, for 0 < __p__ < ∞, __ω__ ∈ __A__ ~∞~

## Abstract Let __L__ be the infinitesimal generator of an analytic semigroup on __L__^2^(ℝ^__n__^ ) with Gaussian kernel bound, and let __L__^–__α__ /2^ be the fractional integral of __L__ for 0 < __α__ < __n__. Suppose that __b__ = (__b__~1~, __b__~2~, …, __b__~__m__~ ) is a finite family of loca

After establishing the molecule characterization of the Hardy-Morrey space, we prove the boundedness of the singular integral operator and the Riesz potential. We also obtain the Hardy-Morrey space estimates for multilinear operators satisfying certain vanishing moments. As an application, we study

## Abstract Let $ T ^{A} \_{\Omega, \alpha} $ (0 < __α__ < __n__) be the generalized commutator generated by fractional integral with rough kernel and the __m__–th order remainder of the Taylor formula of a function A. In this paper, the (__L__^__p__^, __L__^__r__^) (__r__ > 1) boundedness, the wea

## Abstract This paper is devoted to the study of the __L^p^__ ‐mapping properties of the higher order commutators __μ__ ^__k__^ ~Ω,__a__~ , __μ__ ^\*,__k__^ ~Ω,__λ__ ,__a__~ and __μ__ ^__k__^ ~Ω,__S__ ,__a__~ , which are formed respectively by a __BMO__ (ℝ^__n__^ ) function __a__ (__x__ ) and a