Bounded and compact multipliers between Bergman and Hardy spaces

We show that ``Toeplitz like'' operators of the form T s u f=P s (uf ), where P s is a weighted Bergman projection, are bounded on the Hardy spaces H p , for 1 p< for certain ``symbols'' u defined on the unit disk. In particular, T s u is bounded if u is of the form u=h+G+ where h is a bounded harmo

1 be bilinear forms which are related as follows: if + and & satisfy B 1 (!, +)=0 and B 2 (!, &)=0 for some !{0, then + { Q&=0. Suppose p &1 +q &1 =1. Coifman, Lions, Meyer and Semmes proved that, if u # L p (R n ) and v # L q (R n ), and the first order systems B 1 (D, u)=0, B 2 (D, v)=0 hold, the

## Abstract Using Herz spaces, we obtain a sufficient condition for a bounded measurable function on ℝ^__n__^ to be a Fourier multiplier on __H^p^~α~__ (ℝ^__n__^ ) for 0 < __p__ < 1 and –__n__ < α ≤ 0. Our result is sharp in a certain sense and generalizes a recent result obtained by Baernstein an

The Duality Between M -Spaces and Compact HAUSDORFF Spaces Dedicated to the memory of Erhard Schmidt on his looth birthday By B. BANASCHEWSKI (Canada)