The L( L)ε endpoint estimate for maximal singular integral operators

Abstract

We prove in this paper the following estimate for the maximal operator T* associated to the singular integral operator T: \|T*f\|L1,∞(w) 1ε ∫Rn |f(x)| ML( L)ε (w)(x)dx, for w≥ 0, 0<ε ≤ 1. This follows from the sharp Lp estimate \|T*f \| Lp(w) p' (1δ)1/p' \|f \|Lp(M L( L)p-1+δ (w)), for 1<p<∞, w≥ 0, 0<δ ≤ 1. As as a consequence we deduce that \|T*f\|L1,∞(w) [w]A1 (e+ [w]A∞) ∫Rn |f| w dx, extending the endpoint results obtained in [LOP] and [HP] to maximal singular integrals. Another consequence is a quantitative two weight bump estimate.