Singular integrals on Lipschitz and Sobolev spaces (Q558400)

Many authors have considered the boundedness of generalized singular integrals (non-convolu\-tion operators) on several function spaces. But they assumed the condition that \(T1=0\). In 1997, Meyer proved the boundedness of generalized singular integrals on Lipschitz and Sobolev spaces when \(T1=0\). In this paper, the author considers the boundedness of these operators by assuming that \(T1\) belongs to some Lipschitz class. His results are applicable to Calderón's commutator.