The supersymmetric method in random matrix theory and applications to QCD

Verbaarschot, J. J. M.

doi:10.1063/1.1853204

Cited by 31 publications

(40 citation statements)

References 110 publications

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“…The width of fluctuations of hermitian degrees of freedom decreases with the system size as 1/ √ N and the aspect ratio τ of the elliptic ensemble (19) approaches minus one as τ = −1 + 4 α 2 /N . The evolution of the shape with α can be found using for instance the supersymmetric method [16]. Having done that one can try to relate the parameter α to β in QCD 3 .…”

Section: Summary and Discussionmentioning

confidence: 99%

Random matrix model forQCD3staggered fermions

2011

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We show that the lowest part of the eigenvalue density of the staggered fermion operator in lattice QCD3 at small lattice coupling constant β has exactly the same shape as in QCD4. This observation is quite surprising, since universal properties of the QCD3 Dirac operator are expected to be described by a non-chiral matrix model. We show that this effect is related to the specific nature of the staggered fermion discretization and that the eigenvalue density evolves towards the non-chiral random matrix prediction when β is increased and the continuum limit is approached. We propose a two-matrix model with one free parameter which interpolates between the two limits and very well mimics the pattern of evolution with β of the eigenvalue density of the staggered fermion operator in QCD3.

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Section: Summary and Discussionmentioning

confidence: 99%

Random matrix model forQCD3staggered fermions

2011

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“…Much of the RMT machinery -such as the saddle-point method, orthogonal polynomials, the Efetov's supersymmetric technique, or the diagrammatic expansion and the free random variables calculus (see for example [23,24,25,26,27,28,29,30,31,32,33,34,35,36] for reviews; these last two techniques are used in this paper) -has been developed in the Hermitian context, and tailored for real spectra. The necessity of dealing with complex spectra demands enhancements of these methods.…”

Section: Non-hermitian Random Matrix Modelsmentioning

confidence: 99%

“…, L, with the cyclic convention 0 = L, where the normalized traces (22) have been used. Results (27), (28) mean that the four blocks of the matrix…”

Section: The Dyson-schwinger's Equationsmentioning

confidence: 99%

Untitled

Burda¹,

Jarosz²,

Livan³

et al. 2011

Acta Phys. Pol. B

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This is a longer version of our article Burda et al., Phys. Rev. E82, 061114 (2010), containing more detailed explanations and providing pedagogical introductions to the methods we use. We consider a product of an arbitrary number of independent rectangular Gaussian random matrices. We derive the mean densities of its eigenvalues and singular values in the thermodynamic limit, eventually verified numerically. These densities are encoded in the form of the so-called M -transforms, for which polynomial equations are found. We exploit the methods of planar diagrammatics, enhanced to the non-Hermitian case, and free random variables, respectively; both are described in the appendices. As particular results of these two main equations, we find the singular behavior of the spectral densities near zero. Moreover, we propose a finite-size form of the spectral density of the product close to the border of its eigenvalues' domain. Also, led by the striking similarity between the two main equations, we put forward a conjecture about a simple relationship between the eigenvalues and singular values of any non-Hermitian random matrix whose spectrum exhibits rotational symmetry around zero.

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“…In particular, it has been shown that the SO(2,1) symmetry of a hyperbolic spin chain is spontaneously broken also in one and two dimensions. In essence, the reason is that a partition function with a noncompact symmetry can only be defined if this symmetry is spontaneously broken to its compact subgroup SO (2). In a conformal invariant theory the spectral density of the Dirac operator also scales as ρ(λ) ∼ V λ α and this scenario might reconcile conformal behavior with universal random matrix statistics [15][16][17].…”

Section: Jhep07(2017)144mentioning

confidence: 99%

“…It has been well established that lattice QCD Dirac spectra fluctuate according to the corresponding random matrix theory in the microscopic domain (see [1][2][3]). Because this agreement is based on the spontaneous breaking of the flavor symmetry, one would expect that, as a consequence of the Coleman-Mermin-Wagner theorem, the agreement with Random Matrix Theory in two dimensions is structurally different from the agreement found in four dimensions.…”

Section: Jhep07(2017)144mentioning

confidence: 99%

Bosonic partition functions at nonzero (imaginary) chemical potential

Kellerstein

Verbaarschot

2017

J. High Energ. Phys.

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We consider bosonic random matrix partition functions at nonzero chemical potential and compare the chiral condensate, the baryon number density and the baryon number susceptibility to the result of the corresponding fermionic partition function. We find that as long as results are finite, the phase transition of the fermionic theory persists in the bosonic theory. However, in case that the bosonic partition function diverges and has to be regularized, the phase transition of the fermionic theory does not occur in the bosonic theory, and the bosonic theory is always in the broken phase.

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The supersymmetric method in random matrix theory and applications to QCD

Cited by 31 publications

References 110 publications

Random matrix model forQCD3staggered fermions

Random matrix model forQCD3staggered fermions

Untitled

Bosonic partition functions at nonzero (imaginary) chemical potential

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