Position and momentum information-theoretic measures of a D-dimensional particle-in-a-box

“…with ln(4π) = 2.5310…. This supplements an earlier conclusion of the independence of the momentum Rényi entropy on the quantum index at the large n. [37] For the continuous probability distributions, a dimensional incompatibility of the items entering the Tsallis entropies precludes their direct usage, but one can analyze the corresponding uncertainty relation from Equation (13), or, equivalently, Equation (11), which for our geometry reads F I G U R E 3 Sum of the position and momentum Rényi entropies R D ρ n α ð Þ+ R D γ n β ð Þ of the Dirichlet well as functions of the parameter α, where the solid line depicts the sum of the functionals of the ground orbital, the dashed curve is for the first excited state, the dotted one is for the level with n = 3, the dash-dotted dependence is for the state with n = 4, the upper (thick) dash-dot-dotted line is for n = 5, and its lower (thin) counterpart depicts function f(α) from Equation (27)…”

“…Explanation of this phenomenon is the same as for the Rényi functionals. [37] Similar to them, the lowest energy quantity t D γ 1 is split off from its counterparts and, as the upper left inset demonstrates, tightens the entropic relation at α = 1/2. To explain this saturation, one has to point out that, at this value of the Tsallis factor, the left-hand side of Equation (11) for our geometry turns to…”

Rényi and Tsallis entropies of the Dirichlet and Neumann one‐dimensional quantum wells

“…with ln(4π) = 2.5310…. This supplements an earlier conclusion of the independence of the momentum Rényi entropy on the quantum index at the large n. [37] For the continuous probability distributions, a dimensional incompatibility of the items entering the Tsallis entropies precludes their direct usage, but one can analyze the corresponding uncertainty relation from Equation (13), or, equivalently, Equation (11), which for our geometry reads F I G U R E 3 Sum of the position and momentum Rényi entropies R D ρ n α ð Þ+ R D γ n β ð Þ of the Dirichlet well as functions of the parameter α, where the solid line depicts the sum of the functionals of the ground orbital, the dashed curve is for the first excited state, the dotted one is for the level with n = 3, the dash-dotted dependence is for the state with n = 4, the upper (thick) dash-dot-dotted line is for n = 5, and its lower (thin) counterpart depicts function f(α) from Equation (27)…”

“…Explanation of this phenomenon is the same as for the Rényi functionals. [37] Similar to them, the lowest energy quantity t D γ 1 is split off from its counterparts and, as the upper left inset demonstrates, tightens the entropic relation at α = 1/2. To explain this saturation, one has to point out that, at this value of the Tsallis factor, the left-hand side of Equation (11) for our geometry turns to…”

Rényi and Tsallis entropies of the Dirichlet and Neumann one‐dimensional quantum wells

“…They are widely used in quantum physics in the analysis of quantum entanglement, quantum revivals, atomic ionization properties . Other several investigations have been carried out for different quantum mechanical systems …”

Quantum information‐theoretic measures for the static screened Coulomb potential

“…For γ = 0, equations (42) and (44) recover respectively the usual cases F [ρ n ] = π 2 n 2 a 2 and F [ ρ n ] = 4a 2 3 1 − 6 π 2 n 2 , according to [29]. Also, we have…”

“…(35b) Figure 1 illustrates the energy eigenstates for the three states of the lowest energies with different values of γa, as well as their probability densities in the x and k spaces. For n = 10, we can see from the figure 2 that the average value of the quantum probability density (29) approaches to the classical probability density (30), in according to the correspondence principle. We also see that when γa increases the mass variation (in relation with the position) grows, which implies that the moment distribution turns out more localised around k = 0.…”

Information-theoretic measures for a position-dependent mass system in an infinite potential well