Random matrices close to Hermitian or unitary: overview of methods and results

Fyodorov, Yan V.; Sommers, Hans-Jürgen

doi:10.1088/0305-4470/36/12/326

Cited by 170 publications

(253 citation statements)

References 125 publications

(301 reference statements)

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“…Using a saddle-point approximation (the exponent achieves its minimum at the boundary t = 1 of the integration domain) we eventually obtain the same result as in (34) lim…”

Section: Evaluating the Limit As Energy Cost For The Splitting We Fousupporting

confidence: 58%

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Large Deviations of Radial Statistics in the Two-Dimensional One-Component Plasma

2016

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The two-dimensional one-component plasma is an ubiquitous model for several vortex systems. For special values of the coupling constant βq 2 (where q is the particles charge and β the inverse temperature), the model also corresponds to the eigenvalues distribution of normal matrix models. Several features of the system are discussed in the limit of large number N of particles for generic values of the coupling constant. We show that the statistics of a class of radial observables produces a rich phase diagram, and their asymptotic behaviour in terms of large deviation functions is calculated explicitly, including next-to-leading terms up to order 1/N . We demonstrate a split-off phenomenon associated to atypical fluctuations of the edge density profile. We also show explicitly that a failure of the fluid phase assumption of the plasma can break a genuine 1/N -expansion of the free energy. Our findings are corroborated by numerical comparisons with exact finite-N formulae valid for βq 2 = 2.

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“…Using a saddle-point approximation (the exponent achieves its minimum at the boundary t = 1 of the integration domain) we eventually obtain the same result as in (34) lim…”

Section: Evaluating the Limit As Energy Cost For The Splitting We Fousupporting

confidence: 58%

“…It would be interesting to see if the results reported in this paper can be extended, at least qualitatively, to the 2D-OCP in more generic confining potentials [14,42,61] (other than radially symmetric [3,34,36]) or for the plasma on different planar surfaces (e.g. on a cylinder [11,12]).…”

Section: Discussionmentioning

confidence: 89%

Large Deviations of Radial Statistics in the Two-Dimensional One-Component Plasma

2016

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“…Another important goal is to apply them to ensembles of non-Hermitian random matrices [26,28], which are certain deformations of the invariant class.…”

Section: Summary and Discussionmentioning

confidence: 99%

Universal Results for Correlations of Characteristic Polynomials: Riemann-Hilbert Approach

Strahov

Fyodorov

2003

Commun. Math. Phys.

144

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We prove that general correlation functions of both ratios and products of characteristic polynomials of Hermitian random matrices are governed by integrable kernels of three different types: a) those constructed from orthogonal polynomials; b) constructed from Cauchy transforms of the same orthogonal polynomials and finally c) those constructed from both orthogonal polynomials and their Cauchy transforms. These kernels are related with the Riemann-Hilbert problem for orthogonal polynomials. For the correlation functions we obtain exact expressions in the form of determinants of these kernels. Derived representations enable us to study asymptotics of correlation functions of characteristic polynomials via Deift-Zhou steepest-descent/stationary phase method for Riemann-Hilbert problems, and in particular to find negative moments of characteristic polynomials. This reveals the universal parts of the correlation functions and moments of characteristic polynomials for arbitrary invariant ensemble of β = 2 symmetry class.

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“…The asymptotic analysis of the weakly non-Hermitian ensembles are of high interest in the mathematics and physics literature and have been studied in [3,4,6,14], see also [11,12]. The numerous physical applications of such random matrices can be found in the review papers [6,7,10].…”

Section: Introductionmentioning

confidence: 99%

“…The numerous physical applications of such random matrices can be found in the review papers [6,7,10].…”

Section: Introductionmentioning

confidence: 99%

Rank One Non-Hermitian Perturbations of Hermitian $$\beta $$ β -Ensembles of Random Matrices

Kozhan

2017

J Stat Phys

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Random matrices close to Hermitian or unitary: overview of methods and results

Cited by 170 publications

References 125 publications

Large Deviations of Radial Statistics in the Two-Dimensional One-Component Plasma

Large Deviations of Radial Statistics in the Two-Dimensional One-Component Plasma

Universal Results for Correlations of Characteristic Polynomials: Riemann-Hilbert Approach

Rank One Non-Hermitian Perturbations of Hermitian $$\beta $$ β -Ensembles of Random Matrices

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