Spectral statistics in semiclassical random-matrix ensembles
- 25 February 1991
- journal article
- research article
- Published by American Physical Society (APS) in Physical Review Letters
- Vol. 66 (8), 986-989
- https://doi.org/10.1103/physrevlett.66.986
Abstract
A novel random-matrix ensemble is introduced which mimics the global structure inherent in the Hamiltonian matrices of autonomous, ergodic systems. Changes in its parameters induce a transition between a Poisson and a Wigner distribution for the level spacings, P(s). The intermediate distributions are uniquely determined by a single scaling variable. Semiclassical constraints force the ensemble to be in a regime with Wigner P(s) for systems with more than two freedoms.Keywords
This publication has 17 references indexed in Scilit:
- Semiclassical structure of HamiltoniansPhysical Review A, 1989
- Universality of Random-Matrix Predictions for the Statistics of Energy LevelsPhysical Review Letters, 1988
- Random-Matrix Theory and Universal Statistics for Disordered Quantum ConductorsPhysical Review Letters, 1987
- A semiclassical sum rule for matrix elements of classically chaotic systemsJournal of Physics A: General Physics, 1987
- Localization by electric fields in one-dimensional tight-binding systemsPhysical Review B, 1986
- Anderson localization for one- and quasi-one-dimensional systemsJournal of Statistical Physics, 1985
- Bound-State Eigenfunctions of Classically Chaotic Hamiltonian Systems: Scars of Periodic OrbitsPhysical Review Letters, 1984
- Localization of Eigenstates and Transport Phenomena in the One-Dimensional Disordered SystemProgress of Theoretical Physics Supplement, 1973
- Distribution of eigenfrequencies for the wave equation in a finite domainAnnals of Physics, 1970
- Characteristic Vectors of Bordered Matrices With Infinite DimensionsAnnals of Mathematics, 1955