Exponential decay estimates for Singular Integral operators

Abstract

The following subexponential estimate for commutators is proved |[|\x∈ Q: |[b,T]f(x)|>tM2f(x)\|≤ c\,e-α\, t\|b\|BMO\, |Q|, t>0.\] where c and α are absolute constants, T is a Calder\'on--Zygmund operator, M is the Hardy Littlewood maximal function and f is any function supported on the cube Q. It is also obtained \[|\x∈ Q: |f(x)-mf(Q)|>tM1/4;Q#(f)(x) \| c\, e-α\,t|Q|, t>0,\] where mf(Q) is the median value of f on the cube Q and M1/4;Q# is Str\"omberg's local sharp maximal function. As a consequence it is derived Karagulyan's estimate \[|\x∈ Q: |Tf(x)|> tMf(x)\| c\, e-c\, t\,|Q| t>0,\] improving Buckley's theorem. A completely different approach is used based on a combination of "Lerner's formula" with some special weighted estimates of Coifman-Fefferman obtained via Rubio de Francia's algorithm. The method is flexible enough to derive similar estimates for other operators such as multilinear Calder\'on--Zygmund operators, dyadic and continuous square functions and vector valued extensions of both maximal functions and Calder\'on--Zygmund operators. On each case, M will be replaced by a suitable maximal operator.