Complete and minimal exponential systems in spaces \(L^ p(\mathbb{R})\) (Q1893652)

The authoress studies the questions of completeness and minimality in the spaces \(L^p (\mathbb{R})\) of the system of weighted exponentials \(\{e^{i \lambda_n t} e^{- t^2/2}\); \(\lambda_n\in \Lambda\}\), where \(\Lambda\) is a sequence of points, located along a cross in the complex plane: \(\Lambda= \Lambda_1 \cup \Lambda_2\); \(\Lambda_1= \{\pm (1+i) (2\pi)^{1/2} (n+ \alpha)^{1/2}\); \(n\in \mathbb{N}\), \(\alpha\in \mathbb{R}\} \cup \{0\}\) and \(\Lambda_2= i\Lambda_1\). For the case \(p=2\) she finds the precise estimates of \(\alpha\) which provide completeness and/or minimality of the system; for \(p\neq 2\), some sufficient conditions are obtained.