Pseudo-Unitary Operators and Pseudo-Unitary Quantum Dynamics
Abstract
We consider pseudo-unitary quantum systems and discuss various properties of pseudo-unitary operators. In particular we prove a characterization theorem for block-diagonalizable pseudo-unitary operators with finite-dimensional diagonal blocks. Furthermore, we show that every pseudo-unitary matrix is the exponential of times a pseudo-Hermitian matrix, and determine the structure of the Lie groups consisting of pseudo-unitary matrices. In particular, we present a thorough treatment of pseudo-unitary matrices and discuss an example of a quantum system with a pseudo-unitary dynamical group. As other applications of our general results we give a proof of the spectral theorem for symplectic transformations of classical mechanics, demonstrate the coincidence of the symplectic group with the real subgroup of a matrix group that is isomorphic to the pseudo-unitary group U(n,n), and elaborate on an approach to second quantization that makes use of the underlying pseudo-unitary dynamical groups.
Cite
@article{arxiv.math-ph/0302050,
title = {Pseudo-Unitary Operators and Pseudo-Unitary Quantum Dynamics},
author = {Ali Mostafazadeh},
journal= {arXiv preprint arXiv:math-ph/0302050},
year = {2015}
}
Comments
Revised and expanded version, includes an application to symplectic transformations and groups, accepted for publication in J. Math. Phys