Riesz bases from orthonormal bases by replacement
Abstract
Given an orthonormal basis V= \vj\ j∈ N in a separable Hilbert space H and a set of unit vectors B=\wj\j∈ N, we consider the sets BN obtained by replacing the vectors v1, ...,\, vN with vectors w1,\, ...,\, wN. We show necessary and sufficient conditions that ensure that the sets BN are Riesz bases of H and we estimate the frame constants of the BN. Then, we prove conditions that ensure that B is a Riesz basis. Applications to the construction of exponential bases on domains of Rd are also presented.
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