Completeness in $L^1(R)$ of discrete translates
arXiv:math/0307323
Abstract
We characterize, in terms of the Beurling-Malliavin density, the discrete spectra $Î\subset\R$ for which a generator exists, that is a function $Ï\in L^1(\R)$ such that its $Î$-translates $Ï(x-λ), λ\inÎ$, span $L^1(\R)$. It is shown that these spectra coincide with the uniqueness sets for certain analytic classes. We also present examples of discrete spectra $Î\subset\R$ which do not admit a single generator while they admit a pair of generators.
14 pages, submitted