Mixed inequalities of Fefferman-Stein type for singular integral operators

Abstract

We give Feffermain-Stein type inequalities related to mixed estimates for Calder\'on-Zygmund operators. More precisely, given δ>0, q>1, (z)=z(1++z)δ, a nonnegative and locally integrable function u and v∈ RH∞ Aq, we prove that the inequality \[uv(\x∈ Rn: |T(fv)(x)|v(x)>t\)≤ Ct∫Rn|f|(M, v1-q'u)M((v))\] holds with (z)=zp'+1-q'X[0,1](z)+zp'X[1,∞)(z), for every t>0 and every p>\q,1+1/δ\. This inequality provides a more general version of mixed estimates for Calder\'on-Zygmund operators proved in CruzUribe-Martell-Perez. It also generalizes the Fefferman-Stein estimates given in P94 for the same operators. We further get similar estimates for operators of convolution type with kernels satisfying an L-H\"ormander condition, generalizing some previously known results which involve mixed estimates and Fefferman-Stein inequalities for these operators.