A priori estimates for Schrödinger type multipliers (Q5954280)

The authors reprove a Strichartz-type estimate of Bourgain for Schrödinger-type equations on the circle. More precisely, if \(f(x,t)\) is a function of a periodic space variable \(x\) and a real-valued time variable \(t\), then one has the embedding NEWLINE\[NEWLINE \|f\|_{L^4_{t,x}} \leq C \|\langle \tau - \xi^\nu \rangle^{(\nu+1)/4\nu} \widehat {f} \|_{L^2_{\tau,\xi}}NEWLINE\]NEWLINE for any even integer \(\nu\). This is proven using the standard tools of dyadic decomposition, squaring both sides, and then using Plancherel's equation and the Cauchy-Schwarz inequality. The authors then prove an \(L^6\) result in a similar vein (but with the \(L^2\) norm on the right-hand side replaced by the stronger \(L^{3/2}\) norm): NEWLINE\[NEWLINE \|f\|_{L^6_{t,x}} \leq C \|\langle \tau - \xi^\nu \rangle^{(\nu+1)/6\nu} \widehat {f} \|_{L^{3/2}_{\tau,\xi}}.NEWLINE\]