Sharp Strichartz estimate for the 1D periodic Schr\"odinger equation
Abstract
We prove the following estimate \[ \|eit∂x2f\|L(t,x)∈ T26≤ C ( N)1/6 \|f\|L2x(T), \] assuming supp ( f)⊂ [-N,N] for N>1. The bound ( N)1/6 is sharp in view of the lower bound by Bourgain Bourgain.
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