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- Title
Random matrix theory for pseudo-Hermitian systems: Cyclic blocks.
- Authors
Jain, Sudhir R.; Srivastava, Shashi C. L.
- Abstract
We discuss the relevance of random matrix theory for pseudo-Hermitian systems, and, for Hamiltonians that break parity P and time-reversal invariance T. In an attempt to understand the random Ising model, we present the treatment of cyclic asymmetric matrices with blocks and show that the nearest-neighbour spacing distributions have the same form as obtained for the matrices with scalar entries. We also summarize the theory for random cyclic matrices with scalar entries. We have also found that for block matrices made of Hermitian and pseudo-Hermitian sub-blocks of the form appearing in Ising model depart from the known results for scalar entries. However, there is still similarity in trends even in loglog plots.
- Subjects
RANDOM matrices; HERMITIAN symmetric spaces; HAMILTONIAN systems; MATHEMATICAL symmetry; ISING model; LOGARITHMIC functions
- Publication
Pramana: Journal of Physics, 2009, Vol 73, Issue 6, p989
- ISSN
0304-4289
- Publication type
Article
- DOI
10.1007/s12043-009-0174-9