Two-weight inequality for homogeneous singular integral operators (Q2716865)

The author gives some sufficient conditions on the weights \(u(\cdot)\) and \(v(\cdot)\) such that a homogeneous singular integral operator is bounded from the weighted Lebesgue space \(L^p(v(x) dx)\) to \(L^p(u(x) dx)\) for \(1<p<\infty\). These sufficient conditions do not make use of any Muckenhoupt condition and are easy to check since they are just expressed in terms of the behaviour of weights on annuli. Moreover, these sufficient conditions can be reduced to the well-known Muckenhoupt type conditions whenever the weights satisfy some growth assumptions. The author's result is the first solution to the two-weight problem on homogeneous singular integral operators.