A note on exponential Riesz bases
Classical Analysis and ODEs
2022-08-02 v2
Abstract
We prove that if Iℓ=[aℓ,bℓ), ℓ=1,…,L, are disjoint intervals in [0,1) with the property that the numbers 1,a1,…,aL,b1,…,bL are linearly independent over Q, then there exist pairwise disjoint sets Λℓ⊂Z, ℓ=1,…,L, such that for every J⊂{1,…,L}, the system {e2πiλx:λ∈∪ℓ∈JΛℓ} is a Riesz basis for L2(∪ℓ∈JIℓ). Also, we show that for any disjoint intervals Iℓ, ℓ=1,…,L, contained in [1,N) with N∈N, the orthonormal basis {e2πinx:n∈Z} of L2[0,1) can be complemented by a Riesz basis {e2πiλx:λ∈Λ} for L2(∪ℓ=1LIℓ) with some set Λ⊂(N1Z)\Z, in the sense that their union {e2πiλx:λ∈Z∪Λ} is a Riesz basis for L2([0,1)∪I1∪⋯∪IL).
Cite
@article{arxiv.2110.07988,
title = {A note on exponential Riesz bases},
author = {Andrei Caragea and Dae Gwan Lee},
journal= {arXiv preprint arXiv:2110.07988},
year = {2022}
}