AbstractFisher's information and Shannon's entropy are two complementary information measures of a probability distribution. Here, the probability distributions which characterize the quantum-mechanical states of a hydrogenic system are analyzed by means of these two quantities. These distributions are described in terms of Laguerre polynomials and spherical harmonics, whose characteristics are controlled by the three integer quantum numbers of the corresponding states. We have found the explicit expression for the Fisher information, and a lower bound for the Shannon entropy with the help of an isoperimetric inequality
After Shannon, entropy becomes a fundamental quantity to describe not only uncertainity or chaos of ...
The entropic moments of the probability density of a quantum system in position and momentum spaces ...
The polynomials occurring in the wave functions of hydrogenic excited states are found to present di...
AbstractFisher's information and Shannon's entropy are two complementary information measures of a p...
The Fisher-Shannon and Cramer-Rao information measures, and the LMC-like or shape complexity (i.e., ...
The Rényi entropies $R_{p}[\rho], 0<p<\infty$ of the probability density $\rho_{n,l,m}(\vec{r\,})$ ...
This study presents the Shannon and Renyi information entropy for both position and momentum space ...
A method for representing probabilistic aspects of quantum systems by means of a density function on...
We start with a clear distinction between Shannon’s Measure of Information (SMI) and the Thermodynam...
In this paper, we generalize the notion of Shannon’s entropy power to the Rényi-entropy setting. Wit...
AbstractThe probability densities of position and momentum of many quantum systems have the form ρ(x...
Information-theoretic inequalities play a fundamental role in numerous scientific and technological ...
The probability densities of the position and momentum of many quantum systems have the form $\rho(x...
This is a survey of the present knowledge on the analytical determination of the Shannon information...
Shannon entropy and Fisher information functionals are known to quantify certain information-theoret...
After Shannon, entropy becomes a fundamental quantity to describe not only uncertainity or chaos of ...
The entropic moments of the probability density of a quantum system in position and momentum spaces ...
The polynomials occurring in the wave functions of hydrogenic excited states are found to present di...
AbstractFisher's information and Shannon's entropy are two complementary information measures of a p...
The Fisher-Shannon and Cramer-Rao information measures, and the LMC-like or shape complexity (i.e., ...
The Rényi entropies $R_{p}[\rho], 0<p<\infty$ of the probability density $\rho_{n,l,m}(\vec{r\,})$ ...
This study presents the Shannon and Renyi information entropy for both position and momentum space ...
A method for representing probabilistic aspects of quantum systems by means of a density function on...
We start with a clear distinction between Shannon’s Measure of Information (SMI) and the Thermodynam...
In this paper, we generalize the notion of Shannon’s entropy power to the Rényi-entropy setting. Wit...
AbstractThe probability densities of position and momentum of many quantum systems have the form ρ(x...
Information-theoretic inequalities play a fundamental role in numerous scientific and technological ...
The probability densities of the position and momentum of many quantum systems have the form $\rho(x...
This is a survey of the present knowledge on the analytical determination of the Shannon information...
Shannon entropy and Fisher information functionals are known to quantify certain information-theoret...
After Shannon, entropy becomes a fundamental quantity to describe not only uncertainity or chaos of ...
The entropic moments of the probability density of a quantum system in position and momentum spaces ...
The polynomials occurring in the wave functions of hydrogenic excited states are found to present di...