On L1-norms for non-harmonic trigonometric polynomials with sparse frequencies

Abstract

In this paper we show that, if an increasing sequence =(λk)k∈Z has gaps going to infinity λk+1-λk +∞ when k∞, then for every T>0 and every sequence (ak)k∈Z and every N≥ 1, AΣk=0N|ak|1+k≤1T∫-T/2T/2 |Σk=0N ak e2iπλk t|\,dt further, if Σk∈Z11+|λk|<+∞, B|k|≤ N|ak|≤1T∫-T/2T/2 |Σk=-NN ak e2iπλk t|\,dt where A,B are constants that depend on T and only. The first inequality was obtained by Nazarov for T>1 and the second one by Ingham for T≥ 1 under the condition that λk+1-λk≥ 1. The main novelty is that if those gaps go to infinity, then T can be taken arbitrarily small. The result is new even when the λk's are integers where it extends a result of McGehee, Pigno and Smith. The results are then applied to observability of Schr\"odinger equations with moving sensors.