Quantum information entropies for position-dependent mass Schrödinger problem

The Shannon entropy for the position-dependent Schrödinger equation for a particle with a nonuniform solitonic mass density is evaluated in the case of a trivial null potential. The position S_x$S_x$ and momentum S_p$S_p$ information entropies for the three lowest-lying states are calculated. In particular, for these states, we are able to derive analytical solutions for the S_x$S_x$ entropy as well as for the Fourier transformed wave functions, while the S_p$S_p$ quantity is calculated numerically. We notice the behavior of the S_x$S_x$ entropy, namely, it decreases as the mass barrier width narrows and becomes negative beyond a particular width. The negative Shannon entropy exists for the probability densities that are highly localized. The mass barrier determines the stability of the system. The dependence of S_p$S_p$ on the width is contrary to the one for S_x$S_x$. Some interesting features of the information entropy densities ρ_s(x)${\rho }_s\left(x\right)$ and ρ_s(p)${\rho }_s\left(p\right)$ are demonstrated. In addition, the Bialynicki-Birula–Mycielski (BBM) inequality is tested for a number of states and found to hold for all the cases.