Rényi entropies of the highly-excited states of multidimensional harmonic oscillators by use of strong Laguerre asymptotics

Aptekarev, A. I.; Tulyakov, Dmitry Nikolaevich; Toranzo, I. V.; Dehesa, J. S.

doi:10.1140/epjb/e2016-60860-9

Cited by 38 publications

(57 citation statements)

References 74 publications

(134 reference statements)

Supporting

Mentioning

Contrasting

Order By: Relevance

“…Then, the problem of determination of the radial Rényi entropy of a general oscillator‐like state boils down to the study of the asymptotics (

n \to \infty

) of the Laguerre norm

N_{n, l} (p)

. The latter problem can be solved by means of the recent methodology of Aptekarev et al, which takes explicitly into account the different asymptotical representations for the Laguerre polynomials at different regions of the real half‐line.…”

Section: Rényi and Shannon Entropies Of Rydberg‐like Harmonic Statesmentioning

confidence: 99%

“…Then, we determine both the angular contribution to these entropies for all the quantum‐mechanically allowed states of the central potential V(r) and the radial entropy of the highly energetic (i.e., Rydberg) states of the (three‐dimensional) harmonic oscillator in an analytical way. The latter is done by using some recent powerful results of the information theory of Laguerre and Gegenbauer polynomials (see also Refs. [ ]).…”

Section: Introductionmentioning

confidence: 99%

See 1 more Smart Citation

Entropic measures of Rydberg‐like harmonic states

Dehesa

Toranzo

Puertas‐Centeno

2016

Int J of Quantum Chemistry

View full text Add to dashboard Cite

The Shannon entropy, the desequilibrium and their generalizations (R\'enyi and Tsallis entropies) of the three-dimensional single-particle systems in a spherically-symmetric potential $V(r)$ can be decomposed into angular and radial parts. The radial part depends on the analytical form of the potential, but the angular part does not. In this paper we first calculate the angular entropy of any central potential by means of two analytical procedures. Then, we explicitly find the dominant term of the radial entropy for the highly energetic (i.e., Rydberg) stationary states of the oscillator-like systems. The angular and radial contributions to these entropic measures are analytically expressed in terms of the quantum numbers which characterize the corresponding quantum states and, for the radial part, the oscillator strength. In the latter case we use some recent powerful results of the information theory of the Laguerre polynomials and spherical harmonics which control the oscillator-like wavefunctions.Comment: Accepted in International Journal of Quantum Chemistr

show abstract

“…Then, the problem of determination of the radial Rényi entropy of a general oscillator‐like state boils down to the study of the asymptotics (

n \to \infty

) of the Laguerre norm

N_{n, l} (p)

Section: Rényi and Shannon Entropies Of Rydberg‐like Harmonic Statesmentioning

confidence: 99%

Section: Introductionmentioning

confidence: 99%

Entropic measures of Rydberg‐like harmonic states

Dehesa

Toranzo

Puertas‐Centeno

2016

Int J of Quantum Chemistry

View full text Add to dashboard Cite

show abstract

“…Then, uncertainty measures of entropic character [26][27][28][29][30][31][32][33][34] have been considered; they are much more appropriate because, contrary to the Heisenberg-like ones, they do not depend on any specific point of the system. Recently these studies have been extended by calculating the dominant term of the Heisenberglike and Rényi-entropy-based uncertainty measures for both the D-dimensional hydrogenic and harmonic systems at the quassiclassical border in the two conjugated position and momentum spaces [35,36].…”

Section: Introductionmentioning

confidence: 99%

Complexity measures and uncertainty relations of the high-dimensional harmonic and hydrogenic systems

Sobrino¹,

Puertas‐Centeno²,

Toranzo³

et al. 2017

J. Stat. Mech.

View full text Add to dashboard Cite

In this work we find that not only the Heisenberg-like uncertainty products and the Rényi-entropy-based uncertainty sum have the same first-order values for all the quantum states of the D-dimensional hydrogenic and oscillator-like systems, respectively, in the pseudoclassical (D → ∞) limit but a similar phenomenon also happens for both the Fisherinformation-based uncertainty product and the Shannon-entropy-based uncertainty sum, as well as for the Crámer-Rao and Fisher-Shannon complexities. Moreover, we show that the LMC (López-Ruiz-Mancini-Calvet) and LMC-Rényi complexity measures capture the hydrogenic-harmonic difference in the high dimensional limit already at first order.

show abstract

“…In addition, the Shannon entropy for the highdimensional (i.e., pseudoclassical) harmonic states has been already conjectured [59]. We should also mention here that the other basic uncertainty measures (namely the Heisenberg-like measures, the Fisher information and the Rényi entropies) have been recently calculated for all stationary states of the multidimensional harmonic system in [60][61][62], [63] and [59] respectively, for the highdimensional harmonic states in [64] and for the Rydberg harmonic states in [47,57]. See also [65] for the values of the Rényi entropies for the Rydberg states of the one-dimensional harmonic oscillator.…”

mentioning

confidence: 99%

Exact Shannon entropies for the multidimensional harmonic states

Toranzo

Dehesa

2019

Physica A: Statistical Mechanics and its Applications

View full text Add to dashboard Cite

In this work we determine and discuss the entropic uncertainty measures of Shannon type for all the discrete stationary states of the multidimensional harmonic systems directly in terms of the states' hyperquantum numbers, the dimensionality and the oscillator strength.We have found that these entropies have a monotonically increasing behavior when both the dimensionality and the population of the states are increasing Keywords: Shannon entropy; multidimensional harmonic systems I. INTRODUCTIONThe Shannon information entropy of a probability distribution [1,2] is well known to be not only the cornerstone of the classical communication and computation [3,4] but also to play a relevant role for the analysis, description and interpretation of numerous physical phenomena and systems in a great variety of scientific fields ranging from electronic structure [5-8]), atomic spectroscopy [10-12] and molecular systems [13][14][15][16][17] till quantum uncertainty [18, 19], relativistic physics [20], seismic events [22], signals and chaos theory [23-25], neural networks [26], applied mathematics [27, 28], quantum information [29, 30] and Bose-Einstein condensates [31].

show abstract

Rényi entropies of the highly-excited states of multidimensional harmonic oscillators by use of strong Laguerre asymptotics

Cited by 38 publications

References 74 publications

Entropic measures of Rydberg‐like harmonic states

Entropic measures of Rydberg‐like harmonic states

Complexity measures and uncertainty relations of the high-dimensional harmonic and hydrogenic systems

Exact Shannon entropies for the multidimensional harmonic states

Contact Info

Product

Resources

About