Two weight Lp-inequalities for dyadic shifts and the dyadic square function

Abstract

We consider two weight Lp Lq-inequalities for dyadic shifts and the dyadic square function with general exponents 1<p,q<∞. It is shown that if a so-called quadratic Ap,q-condition related to the measures holds, then a family of dyadic shifts satisfies the two weight estimate in an R-bounded sense if and only if it satisfies the direct- and the dual quadratic testing condition. In the case p=q=2 this reduces to the result by T. Hyt\"onen, C. P\'erez, S. Treil and A. Volberg. The dyadic square function satisfies the two weight estimate if and only if it satisfies the quadratic testing condition and the quadratic Ap,q-condition holds. Again in the case p=q=2 we recover the result by F. Nazarov, S. Treil and A. Volberg. An example shows that in general the quadratic Ap,q-condition is stronger than the Muckenhoupt type Ap,q-condition.