Title of article
Eigenvalue distributions in Yang-Mills integrals
Author/Authors
Werner Krauth، نويسنده , , Matthias Staudacher، نويسنده ,
Issue Information
روزنامه با شماره پیاپی سال 1999
Pages
5
From page
253
To page
257
Abstract
We investigate one-matrix correlation functions for finite SU(N) Yang-Mills integrals with and without supersymmetry. We propose novel convergence conditions for these correlators which we determine from the one-loop perturbative effective action. These conditions are found to agree with non-perturbative Monte Carlo calculations for various gauge groups and dimensions. Our results yield important insights into the eigenvalue distributions ϱ(λ) of these random matrix models. For the bosonic models, we find that the spectral densities ϱ(λ) posses moments of all orders as N → ∞. In the supersymmetric case, ϱ(λ) is a wide distribution with an N - independent asymptotic behavior ϱ(λ) ∼ λ−3,λ−7,λ−15 for dimensions D = 4,6,10, respectively.
Journal title
PHYSICS LETTERS B
Serial Year
1999
Journal title
PHYSICS LETTERS B
Record number
911326
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