On the Calder\'on-Zygmund structure of Petermichl's kernel. Weighted inequalities

Abstract

We show that Petermichl's dyadic operator P (S. Petermichl (2000), Dyadic shifts and a logarithmic estimate for Hankel operators with matrix symbol) is a Calder\'on-Zygmund type operator on an adequate metric normal space of homogeneous type. As a consequence of a general result on spaces of homogeneous type, we get weighted boundedness of the maximal operator P* of truncations of the singular integral. We show that dyadic Ap weights are the good weights for the maximal operator P* of the scale truncations of P.