2020
DOI: 10.48550/arxiv.2007.15259
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Derivative principles for invariant ensembles

Abstract: A big class of ensembles of random matrices are those which are invariant under group actions so that the eigenvectors become statistically independent of the eigenvalues. In the present work we show that this is not the sole consequence but that the joint probability distribution of the eigenvalues can be expressed in terms of a differential operator acting on the distribution of some other matrix quantities which are sometimes easier accessible. Those quantities might be the diagonal matrix entries as it is … Show more

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Cited by 3 publications
(7 citation statements)
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“…Indeed it seems to be rather straightforward to three of those, namely random matrices invariant under their respective conjugate group actions that are imaginary anti-symmetric, Hermitian anti-self-dual, and Hermitian chiral. The reason is that there are derivative principal for all three classes [57]. Those can be traced back to known group integrals.…”
Section: Discussionmentioning
confidence: 99%
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“…Indeed it seems to be rather straightforward to three of those, namely random matrices invariant under their respective conjugate group actions that are imaginary anti-symmetric, Hermitian anti-self-dual, and Hermitian chiral. The reason is that there are derivative principal for all three classes [57]. Those can be traced back to known group integrals.…”
Section: Discussionmentioning
confidence: 99%
“…It is proven in subsection 2.3. So far this theorem was only shown [29,38,64,57] when a density for the measure exists; it is restated in Proposition 7.…”
Section: 2)mentioning
confidence: 98%
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“…This category, in turn, belongs to that of Muttalib-Borodin biorthogonal ensembles [77,78]. The second approach, on the other hand, relies on the application of the so called derivative principle which gives a very interesting and powerful connection between the joint probability density of eigenvalues of a random matrix drawn from a unitarily invariant ensemble and that of its diagonal elements [71,79,80]. This leads to the realization of a Pólya ensemble, i.e., polynomial ensemble of a derivative type [22,23,76].…”
Section: Introductionmentioning
confidence: 99%