Information dynamics in quantum theory
arXiv:quant-ph/0612151
Abstract
Shannon entropy and Fisher information functionals are known to quantify certain information-theoretic properties of continuous probability distributions of various origins. We carry out a systematic study of these functionals, while assuming that the pertinent probability density has a quantum mechanical appearance $Ï\doteq |Ï|^2$, with $Ï\in L^2(R)$. Their behavior in time, due to the quantum Schrödinger picture evolution-induced dynamics of $Ï(x,t)$ is investigated as well, with an emphasis on thermodynamical features of quantum motion.
11 pages