The asymptotics of the Boltzmann-Shannon information entropy as well as the Renyi entropy for the quantum probability density of a single-particle system with a confining (i.e., bounded below) power-type potential V(x)=x^2k with k∈N and x∈R, is investigated in the position and momentum spaces within the semiclassical (WKB) approximation. It is found that for highly excited states both physical entropies, as well as their sum, have a logarithmic dependence on its quantum number not only when k=1 (harmonic oscillator), but also for any fixed k. As a by-product, the extremal case k→∞ (the infinite well potential) is also rigorously analyzed. It is shown that not only the position-space entropy has the same constant value for all quantum states...
This thesis consolidates, improves and extends the smooth entropy framework for non-asymptotic infor...
There has been interest (1) (2) in calculating high energy single particle wavefunction entropies us...
Since the introduction of the (smooth) min- and max-entropy, various results have affirmed their fun...
The asymptotics of the Boltzmann-Shannon information entropy as well as the Renyi entropy for the qu...
This is a survey of the present knowledge on the analytical determination of the Shannon information...
Quantum information entropies for the one dimensional Morse potential are discussed in position and ...
AbstractThis is a survey of the present knowledge on the analytical determination of the Shannon inf...
In this work, we study the quantum information entropies for two different types of hyperbolic singl...
The position and momentum space information entropies for the Morse potential are numerically obtain...
The Shannon entropy for the position-dependent Schrödinger equation for a particle with a nonuniform...
Shannon entropy for the position and momentum eigenstates of an asymmetric trigonometric Rosen–Morse...
The Rényi entropies constitute a family of information measures that generalizes the well-known Shan...
A method for representing probabilistic aspects of quantum systems by means of a density function on...
The Rényi entropies constitute a family of information measures that generalizes the well-known Shan...
An uncertainty-type lower bound [I. Bialynicki-Birula and J. Mycielski, Commun. Math. Phys. 44, 129 ...
This thesis consolidates, improves and extends the smooth entropy framework for non-asymptotic infor...
There has been interest (1) (2) in calculating high energy single particle wavefunction entropies us...
Since the introduction of the (smooth) min- and max-entropy, various results have affirmed their fun...
The asymptotics of the Boltzmann-Shannon information entropy as well as the Renyi entropy for the qu...
This is a survey of the present knowledge on the analytical determination of the Shannon information...
Quantum information entropies for the one dimensional Morse potential are discussed in position and ...
AbstractThis is a survey of the present knowledge on the analytical determination of the Shannon inf...
In this work, we study the quantum information entropies for two different types of hyperbolic singl...
The position and momentum space information entropies for the Morse potential are numerically obtain...
The Shannon entropy for the position-dependent Schrödinger equation for a particle with a nonuniform...
Shannon entropy for the position and momentum eigenstates of an asymmetric trigonometric Rosen–Morse...
The Rényi entropies constitute a family of information measures that generalizes the well-known Shan...
A method for representing probabilistic aspects of quantum systems by means of a density function on...
The Rényi entropies constitute a family of information measures that generalizes the well-known Shan...
An uncertainty-type lower bound [I. Bialynicki-Birula and J. Mycielski, Commun. Math. Phys. 44, 129 ...
This thesis consolidates, improves and extends the smooth entropy framework for non-asymptotic infor...
There has been interest (1) (2) in calculating high energy single particle wavefunction entropies us...
Since the introduction of the (smooth) min- and max-entropy, various results have affirmed their fun...