Weighted weak type endpoint estimates for the composition of Calderon-Zygmund operators

Abstract

Let T1, T2 be two Calder\'on-Zygmund operators and T1,\,b be the commutator of T1 with symbol b∈ BMO(Rn). In this paper, the author prove that, the composite operator T1T2 satisfies the following estimate: for λ>0 and weight w∈ A1(Rn), eqnarray*&&w(\x∈Rn:\,|T1 T2f(x)|>λ\)\\ && [w]A1[w]A∞ ( e+[w]A∞) ∫Rn|f(x)|λ ( e+|f(x)|λ)w(x)dx, eqnarray* and the composite operator T1,bT2 satisfies that eqnarray*&&w(\x∈Rn:\,|T1,b T2f(x)|>λ\)\\ && [w]A1[w]A∞2 ( e+[w]A∞) ∫Rn|f(x)|λ2 ( e+|f(x)|λ)w(x)dx. eqnarray*