Lp Estimates for Semi-Degenerate Simplex Multipliers

Abstract

Muscalu, Tao, and Thiele prove Lp estimates for the "Biest" operator defined on Schwartz functions by the map align* 5mm C1,1,1:& (f1, f2, f3) ∫_1 < 2< 3 [ Πj=13 fj (j) e2 π i x j ] d align* via a time-frequency argument that produces bounds for all multipliers with non-degenerate trilinear simplex symbols. In this article we prove Lp estimates for a pair of simplex multipliers for which the non-degeneracy condition fails and which are defined on Schwartz functions by the maps align* C1,1,-2:& (f1, f2, f3) ∫_1 <2 < -32[ Πj=13 fj (j) e2 π i x j ] d align* align* C1,1,1,-2:& (f1, f2, f3, f4) ∫_1 <2 < 3< -42 [Πj=14 fj (j) e2 π i x j ] d . align* Our argument combines the standard 2-based energy with an 1-based energy in order to enable summability over various size parameters. As a consequence, we obtain that C1,1,-2 maps into Lp for all 1/2< p < ∞ and C1,1,1,-2 maps into Lp for all 1/3 < p < ∞. Both target Lp ranges are shown to be sharp.