Exponential bases for partitions of intervals

Abstract

For a partition of [0,1] into intervals I1,…,In we prove the existence of a partition of Z into 1,…, n such that the complex exponential functions with frequencies in k form a Riesz basis for L2(Ik), and furthermore, that for any J⊂eq\1,\,2,\,…,\,n\, the exponential functions with frequencies in j∈ Jj form a Riesz basis for L2(I) for any interval I with length |I|=Σj∈ J|Ij|. The construction extends to infinite partitions of [0,1], but with size limitations on the subsets J⊂eq Z; it combines the ergodic properties of subsequences of Z known as Beatty-Fraenkel sequences with a theorem of Avdonin on exponential Riesz bases.