Borderline Weak Type Estimates for Singular Integrals and Square Functions

Abstract

For any Calder\'on-Zygmund operator T, any weight w, and α >1, the operator T is bounded as a map from L 1 (M L L ( L) α w ) into weak-L1(w). The interest in questions of this type goes back to the beginnings of the weighted theory, with prior results, due to Coifman-Fefferman, P\'erez, and Hyt\"onen-P\'erez, on the L ( L) ε scale. Also, for square functions S f, and weights w ∈ Ap, the norm of S from L p (w) to weak-Lp (w), 2≤ p < ∞ , is bounded by [w] Ap1/2 (1+ [w] A ∞ ) 1/2 , which is a sharp estimate.