Maciej M. Duras
Published 2003-06-17Version 1
The new Theorem on location of maximum of probability density functions of dimensionless second difference of the three adjacent energy levels for $N$-dimensional Gaussian orthogonal ensemble GOE($N$), $N$-dimensional Gaussian unitary ensemble GUE($N$), $N$-dimensional Gaussian symplectic ensemble GSE($N$), and Poisson ensemble PE, is formulated: {\it The probability density functions of the dimensionless second difference of the three adjacent energy levels take on maximum at the origin for the following ensembles: GOE($N$), GUE($N$), GSE($N$), and PE, where $N \geq 3$.} The notions of {\it level homogenization with level clustering} and {\it level homogenization with level repulsion} are introduced. [poster session of ICSSUR'6].
Comments: 3 pages; poster session (section h) of the conference: "ICSSUR'6, Sixth International Conference on Squeezed States and Uncertainty Relations"; 24th May 1999 - 29th May 1999; Universita' degli Studi di Napoli 'Federico II', Naples, Italy (1999)
Description of Quantum Systems by Random Matrix Ensembles of High Dimensions
Reversal of Thermal Rectification in Quantum Systems
Floquet Thermalization: Symmetries and Random Matrix Ensembles
