Borderline weighted estimates for commutators of singular integrals

Abstract

In this paper we establish the following estimate \[ w(\ x∈Rn\,:\,|[b,T]f(x)| > λ\ )≤ cT2∫Rn(\|b\|BMO|f(x)|λ)ML( L)1+w(x)dx \] where w≥0, \, 0<<1 and (t)=t(t++(t)). This inequality relies upon the following sharp Lp estimate \[ \|[b,T]f\|Lp(w)≤ cT(p')2p2(p-1δ)1p' \|b\|BMO \, \|f \|Lp(ML( L)2p-1+δw) \]where 1<p<∞, w≥0 and 0<δ<1. As a consequence we recover the following estimate \[w(\x∈Rn\,:\,|[b,T]f(x)| >λ\)≤ cT\,[w]A∞(1++[w]A∞)2∫Rn (\|b\|BMO|f(x)|λ)Mw(x)dx\] We also obtain the analogue estimates for symbol-multilinear commutators for a wider class of symbols.