Singular Values for Products of Complex Ginibre Matrices with a Source: Hard Edge Limit and Phase Transition

Forrester, Peter J.; Liu, Dang-Zheng

doi:10.1007/s00220-015-2507-5

Cited by 31 publications

(51 citation statements)

References 67 publications

(147 reference statements)

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“…With {λ j } m j=1 denoting the positive eigenvalues, the variables x j = λ 2 j /2 2M are distributed as for the eigenvalues of the product ensemble 15) where {G i } are m × m complex random matrices with PDF proportional to…”

Section: )mentioning

confidence: 99%

Orthogonal and symplectic Harish-Chandra integrals and matrix product ensembles

Forrester

Ipsen

Liu

et al. 2019

Random Matrices: Theory Appl.

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In this paper, we highlight the role played by orthogonal and symplectic Harish-Chandra integrals in the study of real-valued matrix product ensembles. By making use of these integrals and the matrix-valued Fourier-Laplace transform, we find the explicit eigenvalue distributions for particular Hermitian anti-symmetric matrices and particular Hermitian anti-self dual matrices, involving both sums and products. As a consequence of these results, the eigenvalue probability density function of the random product structure X M · · · X 1 (iA)X T 1 · · · X T M , where each X i is a standard real Gaussian matrix, and A is a real anti-symmetric matrix can be determined. For M = 1 and A the bidiagonal anti-symmetric matrix with 1's above the diagonal, this reclaims results of Defosseux. For general M , and this choice of A, or A itself a standard Gaussian anti-symmetric matrix, the eigenvalue distribution is shown to coincide with that of the squared singular values for the product of certain complex Gaussian matrices first studied by Akemann et al. As a point of independent interest, we also include a self-contained diffusion equation derivation of the orthogonal and symplectic Harish-Chandra integrals.

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Section: )mentioning

confidence: 99%

Orthogonal and symplectic Harish-Chandra integrals and matrix product ensembles

Forrester

Ipsen

Liu

et al. 2019

Random Matrices: Theory Appl.

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“…Using the asymptotics for the Airy function at large arguments and the fact that |f n (z)| ≤ Cn 2/3 |z − 1| for some constant C > 0 independent of n, for z sufficiently close to 1, it follows again that there exists a constant c 3 such that 18) for n sufficiently large. Finally, we have for z ∈ D δ , 19) as n → ∞, with f n a conformal map defined in a neighbourhood of 0 and satisfying…”

Section: Proof Of Lemma 12mentioning

confidence: 99%

“…A different type of (deterministic) perturbation of products of Ginibre matrices has been studied in [18]. …”

Section: Remarkmentioning

confidence: 99%

Gaussian perturbations of hard edge random matrix ensembles

Claeys

Doeraene

2016

Nonlinearity

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We study the eigenvalue correlations of random Hermitian n × n matrices of the form S = M + ǫH, where H is a GUE matrix, ǫ > 0, and M is a positive-definite Hermitian random matrix, independent of H, whose eigenvalue density is a polynomial ensemble. We show that there is a soft-to-hard edge transition in the microscopic behaviour of the eigenvalues of S close to 0 if ǫ tends to 0 together with n → +∞ at a critical speed, depending on the random matrix M . In a double scaling limit, we obtain a new family of limiting eigenvalue correlation kernels. We apply our general results to the cases where (i) M is a Laguerre/Wishart random matrix, (ii) M = G * G with G a product of Ginibre matrices, (iii) M = T * T with T a product of truncations of Haar distributed unitary matrices, and (iv) the eigenvalues of M follow a Muttalib-Borodin biorthogonal ensemble.

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“…Remark 2. 16. In fact, one can scale the correlation function (2.20) so that the multiple factor can be absorbed into the kernel, that is ρ r,s (x 1 , · · · , x r ; y 1 , · · · , y s ) = det…”

Section: )mentioning

confidence: 99%

“…[2] for a review of the latter. Not long after, it was found that particular Meijer-G kernels also control the hard edge correlations for many examples of determinantal point processes specified by the squared singular values of particular random matrix products [1,12,16,23,25,35]. A special case, which can be written in terms for the Wright's generalised Bessel function, had in fact been found earlier in the analysis of the hard edge limit for what are now referred to as Muttalib-Borodin ensembles [6,30]; see also the more recent work [18].…”

Section: Introductionmentioning

confidence: 99%

Fox H-kernel and θ-deformation of the Cauchy Two-Matrix Model and Bures Ensemble

Forrester

2019

International Mathematics Research Notices

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A θ-deformation of the Laguerre weighted Cauchy two-matrix model, and the Bures ensemble, is introduced. Such a deformation is familiar from the Muttalib-Borodin ensemble. The θ-deformed Cauchy-Laguerre two-matrix model is a two-component determinantal point process. It is shown that the correlation kernel, and its hard edge scaled limit, can be written as the Fox H-functions, generalising the Meijer G-function class known from the study of the case θ = 1. In the θ = 1 case, it is shown Laguerre-Bures ensemble is related to the Laguerre-Cauchy two-matrix model, notwithstanding the Bures ensemble corresponds to a Pfaffian point process.This carries over to the θ-deformed case, allowing explicit expressions involving Fox H-functions for the correlation kernel, and its hard edge scaling limit, to be obtained.2010 Mathematics Subject Classification. 66B20, 15A15, 33E20.Through the variable transformation x → x/t and y → y/t, we see that the dependence on t can be written as J j,k (t) = t −(1+a+b+θ(j+k−2)) I j,k (a, b; θ) and d dt J j,k (t) = −t −(2+a+b+θ(j+k−2)) (1 + a + b + θ(j + k − 2))I j,k (a, b; θ).

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Singular Values for Products of Complex Ginibre Matrices with a Source: Hard Edge Limit and Phase Transition

Cited by 31 publications

References 67 publications

Orthogonal and symplectic Harish-Chandra integrals and matrix product ensembles

Orthogonal and symplectic Harish-Chandra integrals and matrix product ensembles

Gaussian perturbations of hard edge random matrix ensembles

Fox H-kernel and θ-deformation of the Cauchy Two-Matrix Model and Bures Ensemble

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