A note on maximal operators for the Schrödinger equation on $\mathbb{T}^1.$

Abstract: Motivated by the study of the maximal operator for the Schr\"{o}dinger equation on the one-dimensional torus $ \mathbb{T}^1 $, it is conjectured that for any complex sequence $ {b_n}{n=1}^N $, $$ \left| \sup{t\in [0,N^2]} \left|\sum_{n=1}^N b_n e \left(x\frac{n}{N} + t\frac{n^2}{N^2} \right) \right| \right|{L^4([0,N])} \leq C\epsilon N^{\epsilon} N^{\frac{1}{2}} |b_n|{\ell^2} $$ In this note, we show that if we replace the sequence $ {\frac{n^2}{N^2}}{n=1}^N $ by an arbitrary sequence $ {a_n}{n=1}^N $ with only some convex properties, then $$ \left| \sup{t\in [0,N^2]} \left|\sum_{n=1}^N b_n e \left(x\frac{n}{N} + ta_n \right) \right| \right|{L^4([0,N])} \leq C\epsilon N^\epsilon N^{\frac{7}{12}} |b_n|{\ell^2}. $$ We further show that this bound is sharp up to a $C\epsilon N^\epsilon$ factor.