Sebastian Schierenberg, Falk Bruckmann, Tilo Wettig
Published 2012-02-16, updated 2012-08-21Version 2
We consider the nearest-neighbor spacing distributions of mixed random matrix ensembles interpolating between different symmetry classes, or between integrable and non-integrable systems. We derive analytical formulas for the spacing distributions of 2x2 or 4x4 matrices and show numerically that they provide very good approximations for those of random matrices with large dimension. This generalizes the Wigner surmise, which is valid for pure ensembles that are recovered as limits of the mixed ensembles. We show how the coupling parameters of small and large matrices must be matched depending on the local eigenvalue density.
Comments: 26 pages, 13 figures. (v2) more details on physical applications and one appendix on large-s behavior added, journal version
Journal: Phys.Rev.E85:061130,2012
Accuracy and range of validity of the Wigner surmise for mixed symmetry classes in random matrix theory
Surprising Pfaffian factorizations in Random Matrix Theory with Dyson index $β=2$
Proof of a conjecture on the infinite dimension limit of a unifying model for random matrix theory
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