Abstract
Quantization of the electromagnetic field in non-stationary media (linear with respect to $E$, with negative differential conductivity) is investigated. The dynamical invariants and statistical properties of the field are found in such media. It is shown that in the eigenstates of linear dynamical invariant, the Schrödinger uncertainty relation is minimized. The time evolution of the tree independent second-order statistical moments (quantum fluctuations: covariance cov(q,p), var(q) and var(p)) are found out.
Information
Digital Object Identifier: 10.7546/giq-14-2013-37-47