On the dimensional weak-type (1,1) bound for Riesz transforms

Abstract

Let Rj denote the jth Riesz transform on Rn. We prove that there exists an absolute constant C>0 such that align* |\|Rjf|>λ\|≤ C(1λ\|f\|L1(Rn)+ |\|Rj|>λ\|) align* for any λ>0 and f ∈ L1(Rn), where the above supremum is taken over measures of the form =Σk=1Nakδck for N ∈ N, ck ∈ Rn, and ak ∈ R+ with Σk=1N ak ≤ 16\|f\|L1(Rn). This shows that to establish dimensional estimates for the weak-type (1,1) inequality for the Riesz tranforms it suffices to study the corresponding weak-type inequality for Riesz transforms applied to a finite linear combination of Dirac masses. We use this fact to give a new proof of the best known dimensional upper bound, while our reduction result also applies to a more general class of Calder\'on-Zygmund operators.