Authors
Citation
Hj. Sommers et S. Iida, EIGENVECTOR STATISTICS IN THE CROSSOVER REGION BETWEEN GAUSSIAN ORTHOGONAL AND UNITARY ENSEMBLES, Physical review. E, Statistical physics, plasmas, fluids, and related interdisciplinary topics, 49(4), 1994, pp. 180002513-180002516
Citations number
15
Categorie Soggetti
Physycs, Mathematical","Phsycs, Fluid & Plasmas
Journal title
ISSN journal
1063651X
Volume
49
Issue
4
Year of publication
1994
Part
A
Pages
180002513 - 180002516
Database
ISI
SICI code
1063-651X(1994)49:4<180002513:ESITCR>2.0.ZU;2-M
Abstract
We give a general framework for the joint probability density of an ei
genvalue and the corresponding eigenvector. This we exactly determine
for random Hamiltonians of the form H = S + ialphaA where S (A) are sy
mmetric (antisymmetric) N-dimensional matrices whose elements are norm
ally distributed. The random matrices H represent the Gaussian ensembl
e intermediate between orthogonal (alpha = 0) and unitary (alpha = 1).
In the limit of N --> infinity, we give the explicit form of the prob
ability density of one component of an eigenvector in the crossover re
gion, alpha2 = O(1/N).