Three observations on commutators of Singular Integral Operators with BMO functions

Abstract

This paper contains three observations on commutators of Singular Integral Operators with BMO functions: 1) The subgaussian local decay for the commutator, namely \[1|Q||\x∈ Q\, : \, |[b,T](fQ)(x)|>M2f(x)t\|≤ c e-ct\|b\|BMO \] is sharp, that is, it is subgaussian and not better. 2) It is not possible to obtain a pointwise control of the commutator by a finite sum of sparse operators defined with L L averages. 3) If w∈ Ap A1 then \| wM(fw)\|L1(Rn)→ L1,∞(Rn)=∞.