Approximately Hadamard matrices and Riesz bases in random frames
Abstract
An matrix with entries which acts on as a scaled isometry is called Hadamard. Such matrices exist in some, but not all dimensions. Combining number-theoretic and probabilistic tools we construct matrices with entries which act as approximate scaled isometries in for all . More precisely, the matrices we construct have condition numbers bounded by a constant independent of . Using this construction, we establish a phase transition for the probability that a random frame contains a Riesz basis. Namely, we show that a random frame in formed by vectors with independent identically distributed coordinates having a non-degenerate symmetric distribution contains many Riesz bases with high probability provided that . On the other hand, we prove that if the entries are subgaussian, then a random frame fails to contain a Riesz basis with probability close to whenever , where are constants depending on the distribution of the entries.
Cite
@article{arxiv.2207.07523,
title = {Approximately Hadamard matrices and Riesz bases in random frames},
author = {Xiaoyu Dong and Mark Rudelson},
journal= {arXiv preprint arXiv:2207.07523},
year = {2023}
}