Abstract
In this paper we establish mapping properties of bilinear Coifman-Meyer multipliers acting on the product spaces H1(Rn)×bmo(Rn) and Lp(Rn)×bmo(Rn), with 1<p<∞. As application of these results, we obtain some related Kato-Ponce-type inequalities involving the endpoint space bmo(Rn), and we also study the pointwise product of a function in bmo(Rn) with functions in H1(Rn), h1(Rn) and Lp(Rn), with 1<p<∞.
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