The probability densities of the position and momentum of many quantum systems have the form $\rho(x)\propto p_n\sp 2(x)\omega(x)$, where $\{p_n(x)\}$ denotes a sequence of hypergeometric-type polynomials orthogonal with respect to the weight function $\omega(x)$. Here we derive an explicit expression for the Fisher information $I=\int {\rm d}x[\rho'(x)]\sp 2/\rho(x)$ corresponding to this kind of distribution, in terms of the coefficients of the second-order differential equation satisfied by the polynomials $p_n(x)$. We work out in detail the particular cases of the classical Hermite, Laguerre and Jacobi polynomials, for which we find the value of Fisher information in closed analytical form and study its asymptotic behaviour in the large...
We investigate a basic question of information theory, namely the evaluation of the Fisher informati...
AbstractThis is a brief account on some results and methods of the asymptotic theory dealing with th...
AbstractThis paper is concerned with the Hermite polynomials in symmetric and rectangular matrix arg...
The probability densities of the position and momentum of many quantum systems have the form $\rho(x...
AbstractThe probability densities of position and momentum of many quantum systems have the form ρ(x...
AbstractThe classical hypergeometric polynomials {pn(x)}n=0∞, which are orthogonal with respect to a...
AbstractThe Renyi, Shannon and Fisher spreading lengths of the classical or hypergeometric orthogona...
AbstractThe Fisher information of the classical orthogonal polynomials with respect to a parameter i...
In this work, the spread of hypergeometric orthogonal polynomials (HOPs) along their orthogonality i...
This work was partially supported by the Agencia Estatal de Investigacion (Spain) and the European R...
AbstractFollowing the lead of J. Dehesa and his collaborators, we compute the Fisher information of ...
This is a survey of the present knowledge on the analytical determination of the Shannon information...
The Boltzmann-Shannon information entropy of probability measures which involve the continuous hyper...
AbstractThis is a survey of the present knowledge on the analytical determination of the Shannon inf...
AbstractFisher's information and Shannon's entropy are two complementary information measures of a p...
We investigate a basic question of information theory, namely the evaluation of the Fisher informati...
AbstractThis is a brief account on some results and methods of the asymptotic theory dealing with th...
AbstractThis paper is concerned with the Hermite polynomials in symmetric and rectangular matrix arg...
The probability densities of the position and momentum of many quantum systems have the form $\rho(x...
AbstractThe probability densities of position and momentum of many quantum systems have the form ρ(x...
AbstractThe classical hypergeometric polynomials {pn(x)}n=0∞, which are orthogonal with respect to a...
AbstractThe Renyi, Shannon and Fisher spreading lengths of the classical or hypergeometric orthogona...
AbstractThe Fisher information of the classical orthogonal polynomials with respect to a parameter i...
In this work, the spread of hypergeometric orthogonal polynomials (HOPs) along their orthogonality i...
This work was partially supported by the Agencia Estatal de Investigacion (Spain) and the European R...
AbstractFollowing the lead of J. Dehesa and his collaborators, we compute the Fisher information of ...
This is a survey of the present knowledge on the analytical determination of the Shannon information...
The Boltzmann-Shannon information entropy of probability measures which involve the continuous hyper...
AbstractThis is a survey of the present knowledge on the analytical determination of the Shannon inf...
AbstractFisher's information and Shannon's entropy are two complementary information measures of a p...
We investigate a basic question of information theory, namely the evaluation of the Fisher informati...
AbstractThis is a brief account on some results and methods of the asymptotic theory dealing with th...
AbstractThis paper is concerned with the Hermite polynomials in symmetric and rectangular matrix arg...