Decoupling inequality for paraboloid under shell type restriction and its application to the periodic Zakharov system

Abstract

In this paper, we establish local well-posedness for the Zakharov system on Td, d3 in a low regularity setting. Our result improves the work of Kishimoto. Moreover, the result is sharp up to -loss of regularity when d=3 and d5 as long as one utilizes the iteration argument. We introduce ideas from recent developments of the Fourier restriction theory. The key element in the proof of our well-posedness result is a new trilinear discrete Fourier restriction estimate involving paraboloid and cone. We prove this trilinear estimate by improving Bourgain--Demeter's range of exponent for the linear decoupling inequality for paraboloid under the constraint that the input space-time function f satisfies supp\, f ⊂ \ (,τ) ∈ Rd+1: 1- 1N || 1 + 1N,\; |τ - ||2| 1N2 \ for large N1.

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