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On the asymptotic distribution of block-modified random matrices

arXiv
Authors: Octavio Arizmendi, Ion Nechita, Carlos Vargas

Year

2015

Paper ID

27659

Status

Preprint

Abstract Read

~2 min

Abstract Words

103

Citations

N/A

Abstract

We study random matrices acting on tensor product spaces which have been transformed by a linear block operation. Using operator-valued free probability theory, under some mild assumptions on the linear map acting on the blocks, we compute the asymptotic eigenvalue distribution of the modified matrices in terms of the initial asymptotic distribution. Moreover, using recent results on operator-valued subordination, we present an algorithm that computes, numerically but in full generality, the limiting eigenvalue distribution of the modified matrices. Our analytical results cover many cases of interest in quantum information theory: we unify some known results and we obtain new distributions and various generalizations.

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  • It adds a 2015 reference point for readers tracking recent quantum research.
  • We study random matrices acting on tensor product spaces which have been transformed by a linear block operation.

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