Commutators of Cauchy--Szego type integrals for domains in Cn with minimal smoothness

Abstract

In this paper we study the commutator of Cauchy type integrals C on a bounded strongly pseudoconvex domain D in Cn with boundary bD satisfying the minimum regularity condition C2 as in the recent result of Lanzani--Stein. We point out that in this setting the Cauchy type integrals C is the sum of the essential part C which is a Calder\'on--Zygmund operator and a remainder R which is no longer a Calder\'on--Zygmund operator. We show that the commutator [b, C] is bounded on Lp(bD) (1<p<∞) if blackand only if\ b is in the BMO space on bD. Moreover, the commutator [b, C] is compact on Lp(bD) (1<p<∞) if blackand only if\ b is in the VMO space on bD. Our method can also be applied to the commutator of Cauchy--Leray integral in a bounded, strongly C-linearly convex domain D in Cn with the boundary bD satisfying the minimum regularity C1,1. Such a Cauchy--Leray integral is a Calder\'on--Zygmund operator as proved in the recent result of Lanzani--Stein. We also point out that our method provides another proof of the boundedness and compactness of commutator of Cauchy--Szeg o operator on a bounded strongly pseudoconvex domain D in Cn with smooth boundary (first established by Krantz--Li).