On the ubiquity of the Cauchy distribution in spectral problems

Aizenman, Michael; Warzel, Simone

doi:10.1007/s00440-014-0587-3

Cited by 16 publications

(52 citation statements)

References 31 publications

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“…, if the sums are properly regularised, whereas the first relation, (20) requires a deterministic correction depending on E; see Sections 2.3 and 2.2 (relying on the works [34] and [1], respectively). These properties imply that the critical points depend quasi-locally, so to speak, on the zeros / eigenvalues.…”

Section: Corollary 23' Conditionally On the Riemann Hypothesis Thementioning

confidence: 99%

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On the critical points of random matrix characteristic polynomials and of the Riemann ξ-function

Sodin

2017

The Quarterly Journal of Mathematics

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A one-parameter family of point processes describing the distribution of the critical points of the characteristic polynomial of large random Hermitian matrices on the scale of mean spacing is investigated. Conditionally on the Riemann hypothesis and the multiple correlation conjecture, we show that one of these limiting processes also describes the distribution of the critical points of the Riemann ξ-function on the critical line.We prove that each of these processes boasts stronger level repulsion than the sine process describing the limiting statistics of the eigenvalues: the probability to find k critical points in a short interval is comparable to the probability to find k + 1 eigenvalues there. We also prove a similar property for the critical points and zeros of the Riemann ξ-function, conditionally on the Riemann hypothesis but not on the multiple correlation conjecture.

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Section: Corollary 23' Conditionally On the Riemann Hypothesis Thementioning

confidence: 99%

“…The two limits exist and coincide according to a general criterion of [1], and W(z) is a random element of the Nevanlinna class. Also note that −W(z) is the logarithmic derivative of the function Φ(z) from (4).…”

Section: 2mentioning

confidence: 99%

On the critical points of random matrix characteristic polynomials and of the Riemann ξ-function

Sodin

2017

The Quarterly Journal of Mathematics

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“…Much of the information that has traditionally been of interest can be succinctly summarized within this new framework and furthermore new questions are brought to the surface by the change of focus. Papers making use of this perspective include [AW15,CNN17,Sod17].…”

Section: Introductionmentioning

confidence: 99%

The Limiting Characteristic Polynomial of Classical Random Matrix Ensembles

Chhaibi¹,

Hovhannisyan²,

Najnudel

et al. 2019

Ann. Henri Poincaré

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We demonstrate the convergence of the characteristic polynomial of several random matrix ensembles to a limiting universal function, at the microscopic scale. The random matrix ensembles we treat are classical compact groups and the Gaussian Unitary Ensemble.In fact, the result is the by-product of a general limit theorem for the convergence of random entire functions whose zeros present a simple regularity property.

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“…Most of the arguments of section II A only rely on the fact that the elements of W are independent, identically distributed random random variables with a finite second moment, but not necessarily Gaussian. If the second moment is finite, we expect that all the above results will generalize, since they only rely on local properties of the spectrum (see [4,10]). Let us remind the reader how such arguments must be adapted to the case where the matrix elements of W have a diverging second moment, or more precisely when:…”

Section: The Lévy Casementioning

confidence: 95%

“…In this case, the Cauchy distribution for g was actually derived by Y. Fyodorov and collaborators for the GOE and GUE ensembles, using rather specific Random Matrix Theory techniques [1][2][3]. It was recently proven by Aizenman & Warzel [4] that the Cauchy distribution is in fact super-universal and holds not only for all Coulomb gas models, for arbitrary values of β, but in fact for a much wider class of point processes on the real axis. The gist of the argument of Aizenman & Warzel is summarized in Appendix A.…”

Section: The Resolvent Of a Wigner Matrix On The Real Axis Is Caumentioning

confidence: 95%

Two short pieces around the Wigner problem

Bouchaud¹,

Potters²

2018

J. Phys. A: Math. Theor.

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We revisit the classic Wigner semi-circle from two different angles. One consists in studying the Stieltjes transform directly on the real axis, which does not converge to a fixed value but follows a Cauchy distribution that depends on the local eigenvalue density. This result was recently proven by Aizenman & Warzel for a wide class of eigenvalue distributions. We shed new light onto their result using a Coulomb gas method. The second angle is to derive a Langevin equation for the full (matrix) resolvent, extending Dyson's Brownian motion framework. The full matrix structure of this equation allows one to recover known results on the overlaps between the eigenvectors of a fixed matrix and its noisy counterpart.

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On the ubiquity of the Cauchy distribution in spectral problems

Cited by 16 publications

References 31 publications

On the critical points of random matrix characteristic polynomials and of the Riemann ξ-function

On the critical points of random matrix characteristic polynomials and of the Riemann ξ-function

The Limiting Characteristic Polynomial of Classical Random Matrix Ensembles

Two short pieces around the Wigner problem

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