An A2 Theorem for One-Sided Calder\'on-Zygmund Operators

Abstract

We present a proof of the one-sided A2 theorem in dimension one, with a logarithmic loss. This theorem concerns one-sided Calder\'on-Zygmund operators (CZOs) whose kernels K(x,y) vanish whenever x < y. These operators are bounded on L2(w) provided that the weight w belongs to the one-sided class A2. The argument reduces the norm estimate to testing on indicator functions via a two-weight testing theorem. By combining this with the weak-type (1,1) estimate in the one-sided setting and an extrapolation theorem, we obtain the one-sided A2 theorem with a logarithmic loss. We develop a localized theory on fixed intervals by introducing adapted weight classes and showing that the same quantitative bound holds locally for one-sided operators.

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