$L^p$ estimates for semi-degenerate simplex multipliers

Robert Kesler

doi:10.4171/rmi/1123

JournalsrmiVol. 36, No. 1pp. 99–158

$L^{p}$ estimates for semi-degenerate simplex multipliers

Robert Kesler
Santa Monica, USA

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Abstract

Muscalu, Tao, and Thiele prove $L^{p}$ estimates for the "Biest" operator defined on Schwartz functions by the map

C^{1, 1, 1} : (f_{1}, f_{2}, f_{3}) \mapsto \int_{ξ_{1} < ξ_{2} < ξ_{3}} [j = 1 \prod 3 \hat{f}_{j} (ξ_{j}) e^{2 πi x ξ_{j}}] d ξ

via a time-frequency argument that produces bounds for all multipliers with non-degenerate trilinear simplex symbols. In this article we prove $L^{p}$ estimates for a pair of simplex multipliers defined on Schwartz functions by the maps

C^{1, 1, - 2} : C^{1, 1, 1, - 2} : (f_{1}, f_{2}, f_{3}) \mapsto \int_{ξ_{1} < ξ_{2} < - ξ_{3} / 2} [j = 1 \prod 3 \hat{f}_{j} (ξ_{j}) e^{2 πi x ξ_{j}}] d ξ (f_{1}, f_{2}, f_{3}, f_{4}) \mapsto \int_{ξ_{1} < ξ_{2} < ξ_{3} < - ξ_{4} / 2} [j = 1 \prod 4 \hat{f}_{j} (ξ_{j}) e^{2 πi x ξ_{j}}] d ξ

for which the non-degeneracy condition fails. Our argument combines the standard $ℓ^{2}$ -based energy with an $ℓ^{1}$ -based energy in order to enable summability over various size parameters. As a consequence, we obtain that $C^{1, 1, - 2}$ maps into $L^{p}$ for all $1/2 < p < \infty$ and $C^{1, 1, 1, - 2}$ maps into $L^{p}$ for all $1/3 < p < \infty$ . Both target $L^{p}$ ranges are shown to be sharp.

Cite this article

Robert Kesler, $L^{p}$ estimates for semi-degenerate simplex multipliers. Rev. Mat. Iberoam. 36 (2020), no. 1, pp. 99–158

DOI 10.4171/RMI/1123