Local bounds for singular Brascamp-Lieb forms with cubical structure

Abstract

We prove a range of Lp bounds for singular Brascamp-Lieb forms with cubical structure. We pass through sparse and local bounds, the latter proved by an iteration of Fourier expansion, telescoping, and the Cauchy-Schwarz inequality. We allow 2m-1<p ∞ with m the dimension of the cube, extending an earlier result that required p=2m. The threshold 2m-1 is sharp in our theorems.

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