A generalization of some random variables involving in certain compressive sensing problems
Abstract
In this paper we give a generalization of the discrete complex-valued random variable defined and investigated in \cite{ssa} and \cite{m8}. We prove the statements concerning the expressions for the excepted value and the variance of this random variable. In partucular, such a random variable here is defined for each of rows of any complex or real matrix with . We consider the arithmetic mean of these random variables and we deduce the expressions for the expected value and the variance of . Using the expression for , we establish some equalities and inequalities involving , the Frobenius norm, the largest eigenvalue, the largest singular value and the coherence of a matrix . It is showed that some of these estimates are closely related to the Welch bound of the coherence of a complex or real matrix with . Taking into account that the value of coherence of the measurement matrix in the theory of compressive sensing has a significant role, we believe that our results should be useful for some topics of this theory.
Cite
@article{arxiv.1807.00670,
title = {A generalization of some random variables involving in certain compressive sensing problems},
author = {Romeo Meštrović},
journal= {arXiv preprint arXiv:1807.00670},
year = {2018}
}
Comments
12 pages, no figures; literature is extended and minor corrections in its citations have been made