On the H1-L1 boundedness of operators

Abstract

We prove that if q is in (1,∞), Y is a Banach space and T is a linear operator defined on the space of finite linear combinations of (1,q)-atoms in Rn which is uniformly bounded on (1,q)-atoms, then T admits a unique continuous extension to a bounded linear operator from H1(Rn) to Y. We show that the same is true if we replace (1,q)-atoms with continuous (1,∞)-atoms. This is known to be false for (1,∞)-atoms.