Abstract

We study linear combinations of exponentials e iλnt, λn ∈ Λ in the case where the distance between some points λn tends to zero. We suppose that the sequence Λ is a finite union of uniformly discrete sequences. In (Avdonin and Ivanov, 2001), necessary and sufficient conditions were given for the family of divided differences of exponentials to form a Riesz basis in space L 2 (0, T). Here we prove that if the upper uniform density of Λ is less than T/(2π), the family of divided differences can be extended to a Riesz basis in L 2 (0, T) by adjoining to {e iλnt} a suitable collection of exponentials. Likewise, if the lower uniform density is greater than T/(2π), the family of divided differences can be made into a Riesz basis by removing from {e iλnt} a suitable collection of functions e iλnt. Applications of these results to problems of simultaneous control of elastic strings and beams are given.