Measures of polynomial growth and classical convolution inequalities

Abstract

We study Lp(μ) Lq() mapping properties of the convolution operator Tλf(x)=λ*(fμ)(x) and of the corresponding maximal operator Tλf(x)=t>0 |λt*(fμ)(x)|, where λ is a tempered distribution, and μ and are compactly supported measures satisfying the polynomial growth bounds μ(B(x,r)) ≤ Crsμ and (B(x,r)) ≤ Crs. As a result, we prove variants of the classical Lp-improving (Littman; Strichartz) and maximal (Stein) inequalities in a setting where the Plancherel formula is not available. Connections with the David-Semmes conjecture are also discussed.