The Operator Norm of Paraproducts on Bi-parameter Hardy spaces

Abstract

It is shown that for 0<p,q,r<∞, with 1q = 1p + 1r, the operator norm of the dyadic paraproduct of the form \[ πg(f) := ΣR ∈ D gR f R hR, \] from the bi-parameter dyadic Hardy space Hdp(R) to Hdq(R) is comparable to \|g\|Hdr(R). We also prove that for all 0 < p < ∞, there holds \[ \|g\|BMOd(R) \|πg\|Hdp(R) Hdp(R). \] Similar results are obtained for bi-parameter Fourier paraproducts of the same form.