2019
DOI: 10.1515/apam-2018-0037
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Multiplicative convolution of real asymmetric and real anti-symmetric matrices

Abstract: AbstractThe singular values of products of standard complex Gaussian random matrices, or sub-blocks of Haar distributed unitary matrices, have the property that their probability distribution has an explicit, structured form referred to as a polynomial ensemble. It is furthermore the case that the corresponding bi-orthogonal system can be determined in terms of Meijer G-functions, and the correlation kernel given as an explicit double contour integral. It has recently been show… Show more

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Cited by 25 publications
(39 citation statements)
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“…This theorem is proven in Appendix A.1 in a very similar way as the real counterpart with even dimensional antisymmetric matrices in [23]. This theorem shows that we can deal with all products of the form gxg * with x being m × m Hermitian and g a complex n × m rectangular with m ≤ n in a unified way.…”
Section: Spherical Transformsmentioning
confidence: 62%
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“…This theorem is proven in Appendix A.1 in a very similar way as the real counterpart with even dimensional antisymmetric matrices in [23]. This theorem shows that we can deal with all products of the form gxg * with x being m × m Hermitian and g a complex n × m rectangular with m ≤ n in a unified way.…”
Section: Spherical Transformsmentioning
confidence: 62%
“…The theory of spherical transforms [18] developed by Harish-Chandra et al in the 50's has been extremely helpful in dealing with sums [29,16] and products [25,26,23] of random matrices. Regarding products, originally [18] the action of the complex general group G n = Gl C (n) on the cone of positive Hermitian matrices, (g, x) → gxg * has been considered.…”
Section: Spherical Transformsmentioning
confidence: 99%
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