Sharp L4 Strichartz estimate for Hyperbolic Schr\"odinger equation on R× T

Abstract

We prove the sharp L4 Strichartz estimate without derivative loss for the hyperbolic Schr\"odinger equation on R×T, equation \|eit (∂x12-∂x22) φ\|L4t,x1,x2([0,1]× R × T) \|φ\|Lx1,x22(R × T), equation which serves as the hyperbolic analogue of the classical result of Takaoka-Tzvetkov takaoka20012d. The proof is based on the combination of a robust kernel decomposition method with precise measure estimates for semi-algebraic sets. As an immediate application, we establish the global well-posedness for the cubic hyperbolic Schr\"odinger equation on R×T in the L2-critical space with sufficiently small initial data.

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