On the maximum principle for the Riesz transform

Abstract

Let μ be a measure in Rd with compact support and continuous density, and let Rsμ(x)=∫y-x|y-x|s+1\,dμ(y),\ \ x,y∈ Rd,\ \ 0<s<d. We consider the following conjecture: x∈ Rd|Rsμ(x)| Cx∈supp\,μ|Rsμ(x)|, C=C(d,s). This relation was known for d-1 s<d, and is still an open problem in the general case. We prove the maximum principle for 0< s<1, and also for 0<s<d in the case of radial measure. Moreover, we show that this conjecture is incorrect for non-positive measures.