Simplex Averaging Operators: Quasi-Banach and Lp-Improving Bounds in Lower Dimensions

Abstract

We establish some new Lp-improving bounds for the k-simplex averaging operators Sk that hold in dimensions d ≥ k. As a consequence of these Lp-improving bounds we obtain nontrivial bounds Sk Lp1×·s× Lpk→ Lr with r < 1. In particular we show that the triangle averaging operator S2 maps Ld+1d× Ld+1d → Ld+12d in dimensions d≥ 2. This improves quasi-Banach bounds obtained by Palsson and Sovine and extends bounds obtained by Greenleaf, Iosevich, Krauss, and Liu for the case of k = d = 2.