Boundedness of Calder\'on--Zygmund operators on ball Campanato-type function spaces

Abstract

Let X be a ball quasi-Banach function space on Rn satisfying some mild assumptions. In this article, the authors first find a reasonable version T of the Calder\'on--Zygmund operator T on the ball Campanato-type function space LX,q,s,d(Rn) with q∈[1,∞), s∈Z+n, and d∈(0,∞). Then the authors prove that T is bounded on LX,q,s,d(Rn) if and only if, for any γ∈Zn+ with |γ|≤ s, T*(xγ)=0, which is hence sharp. Moreover, T is proved to be the adjoint operator of T, which further strengthens the rationality of the definition of T. All these results have a wide range of applications. In particular, even when they are applied, respectively, to weighted Lebesgue spaces, variable Lebesgue spaces, Orlicz spaces, Orlicz-slice spaces, Morrey spaces, mixed-norm Lebesgue spaces, local generalized Herz spaces, and mixed-norm Herz spaces, all the obtained results are new. The proofs of these results strongly depend on the properties of the kernel of T under consideration and also on the dual theorem on LX,q,s,d(Rn).