Calderón-Zygmund operators on \(H^p(R^n)\) (Q2740969)

Let \(H^p\) be the Hardy space on \({\mathbb R}^n\) defined by \(\|\sup_{t>0} |f* \varphi_t |\|_p <\infty\) and \(h^p\) its local version defined by \(\|\sup_{0<t<1} |f* \varphi_t|\|_p <\infty\) (\(\varphi\) is any Schwartz function such that \(\int \varphi \neq 0\) and \(\varphi_t(x):=\varphi(x/t)/t^n)\). Let \(T\) be a weak Calderón-Zygmund operator. In the paper under review it is proved that, if \(T^*1=0\), then \(T\) is bounded in \(H^p\) for \(p\leq 1\) over a certain critical index, and also that, if \(T^*1\) belongs to a Lipschitz class \(\text{Lip}_\varepsilon\), then \(T\) is bounded from \(H^p\) to \(h^p\), for \(p\leq 1\) over another critical index. The last result is applied to Calderón commutators and it is proved that the critical indexes are optimal.