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dc.contributor.authorAkemann, G-
dc.identifier.citationJ.Phys. A36: 3363en
dc.description.abstractWe describe in detail the solution of the extension of the chiral Gaussian unitary ensemble (chGUE) into the complex plane. The correlation functions of the model are first calculated for a finite number of N complex eigenvalues, where we exploit the existence of orthogonal Laguerre polynomials in the complex plane. When taking the large-N limit we derive new correlation functions in the case of weak and strong non-Hermiticity, thus describing the transition from the chGUE to a generalized Ginibre ensemble. We briefly discuss applications to the Dirac operator eigenvalue spectrum in quantum chromodynamics with non-vanishing chemical potential.en
dc.format.extent301662 bytes-
dc.publisherInstitute of Physicsen
dc.subjectHigh Energy Physics - Theoryen
dc.subjectChaotic dynamicsen
dc.titleThe solution of a chiral random matrix model with complex eigenvaluesen
dc.typeResearch Paperen
Appears in Collections:Dept of Mathematics Research Papers
Mathematical Sciences

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