Boundedness of Calder\'on--Zygmund Operators on Special John--Nirenberg--Campanato and Hardy-Type Spaces via Congruent Cubes

Abstract

Let p∈[1,∞], q∈(1,∞), s∈Z+:=N\0\, and α∈R. In this article, the authors introduce a reasonable version T of the Calder\'on--Zygmund operator T on JN(p,q,s)αcon(Rn), the special John--Nirenberg--Campanato space via congruent cubes, which coincides with the Campanato space Cα,q,s(Rn) when p=∞. Then the authors prove that T is bounded on JN(p,q,s)αcon(Rn) if and only if, for any γ∈Z+n with |γ|≤ s, T*(xγ)=0, which is a well-known assumption. To this end, the authors find an equivalent version of this assumption. Moreover, the authors show that T can be extended to a unique continuous linear operator on the Hardy-kind space HK(p,q,s)αcon(Rn), the predual space of JN(p',q',s)αcon(Rn) with 1p+1p'=1=1q+1q', if and only if, for any γ∈Z+n with |γ|≤ s, T*(xγ)=0.