Fine structure in the large <mml:math xmlns:mml="http://www.w3.org/1998/Math/MathML" altimg="si121.gif" display="inline" overflow="scroll"><mml:mi>n</mml:mi></mml:math> limit of the non-Hermitian Penner matrix model

Álvarez, Gabriel; Alonso, Luis Martı́nez; Медина, Елена

doi:10.1016/j.aop.2015.07.011

Cited by 7 publications

(12 citation statements)

References 36 publications

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“…From (23) it is clear that for a lensing model corresponding to a unitary ensemble with potential V(x) of degree 2p > 2 the number of dim images cannot exceed 2p − 1 and that this bound is sharp. On the other hand, from (23) and taking (11) into account, Bezout theorem leads to the upper bound 4p 2 for the number of bright images. Although this bound is sharp for the Gaussian model it would be interesting to improve it for the general case.…”

Section: Discussionmentioning

confidence: 99%

“…The present paper focuses on lensing models based on eigenvalue distributions of unitary ensembles of random matrices. Nevertheless, lensing models with similar properties can be generated from more general ensembles of random matrices [22][23][24] in which the eigenvalues are constrained to lie on appropriate curves. It remains to know the interpretation of the associated lensing models.…”

Section: Discussionmentioning

confidence: 99%

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Gravitational lensing by eigenvalue distributions of random matrix models

Alonso¹,

Медина²

2018

Class. Quantum Grav.

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We propose to use eigenvalue densities of unitary random matrix ensembles as mass distributions in gravitational lensing. The corresponding lens equations reduce to algebraic equations in the complex plane which can be treated analytically. We prove that these models can be applied to describe lensing by systems of edge-on galaxies. We illustrate our analysis with the Gaussian and the quartic unitary matrix ensembles.

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Section: Discussionmentioning

confidence: 99%

Section: Discussionmentioning

confidence: 99%

Gravitational lensing by eigenvalue distributions of random matrix models

Alonso¹,

Медина²

2018

Class. Quantum Grav.

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“…[12] can be completely justified in the large-N limit by using techniques similar to those developed for the determination of the asymptotic support of the zeros of certain non-Hermitian families of orthogonal polynomials [17,18,21].…”

Section: Discussionmentioning

confidence: 99%

“…(6) determines a non-Hermitian holomorphic matrix model [19,20] which can be analyzed in the same way as the models recently considered in Refs. [17,18,21]. It should be noticed that Eq.…”

Section: Eigenvalue Densities In the Large N Limitmentioning

confidence: 99%

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Complex saddle points in the Gross-Witten-Wadia matrix model

2016

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We give an exhaustive characterization of the complex saddle point configurations of the Gross-WittenWadia matrix model in the large-N limit. In particular, we characterize the cases in which the saddles accumulate in one, two, or three arcs, in terms of the values of the coupling constant and of the fraction of the total unit density that is supported in one of the arcs, and derive an explicit condition for gap closing associated with nonvacuum saddles. By applying the idea of large-N instanton we also give direct analytic derivations of the weak-coupling and strong-coupling instanton actions.

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Do Orthogonal Polynomials Dream of Symmetric Curves?

Martínez–Finkelshtein

Rakhmanov

2016

Found Comput Math

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Abstract. The complex or non-Hermitian orthogonal polynomials with analytic weights are ubiquitous in several areas such as approximation theory, random matrix models, theoretical physics and in numerical analysis, to mention a few. Due to the freedom in the choice of the integration contour for such polynomials, the location of their zeros is a priori not clear. Nevertheless, numerical experiments, such as those presented in this paper, show that the zeros not simply cluster somewhere on the plane, but persistently choose to align on certain curves, and in a very regular fashion.The problem of the limit zero distribution for the non-Hermitian orthogonal polynomials is one of the central aspects of their theory. Several important results in this direction have been obtained, especially in the last 30 years, and describing them is one of the goals of the first parts of this paper. However, the general theory is far from being complete, and many natural questions remain unanswered or have only a partial explanation.Thus, the second motivation of this paper is to discuss some "mysterious" configurations of zeros of polynomials, defined by an orthogonality condition with respect to a sum of exponential functions on the plane, that appeared as a results of our numerical experiments. In this apparently simple situation the zeros of these orthogonal polynomials may exhibit different behaviors: for some of them we state the rigorous results, while others are presented as conjectures (apparently, within a reach of modern techniques). Finally, there are cases for which it is not yet clear how to explain our numerical results, and where we cannot go beyond an empirical discussion.

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Fine structure in the large n limit of the non-Hermitian Penner matrix model

Cited by 7 publications

References 36 publications

Gravitational lensing by eigenvalue distributions of random matrix models

Gravitational lensing by eigenvalue distributions of random matrix models

Complex saddle points in the Gross-Witten-Wadia matrix model

Do Orthogonal Polynomials Dream of Symmetric Curves?

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