Classical path from quantum motion for a particle in a transparent box

Abstract: We consider the problem of a free particle inside a one-dimensional box with transparent walls (or equivalently, along a circle with a constant speed) and discuss the classical and quantum descriptions of the problem. After calculating the mean value of the position operator in a time-dependent normalized complex general state and the Fourier series of the function position, we explicitly prove that these two quantities are in accordance by (essentially) imposing the approximation of high principal quantum num… Show more

“…Equation (36) is the basis to prove the reality of the eigenvalues and the orthogonality of the eigenfunctions when s = r. If degenerate eigenfunctions turn out to exist then we can make recourse to the Gram-Schmidt recipe [3,8] to orthogonalise them but, for the sake of simplicity, we proceed with the assumption of degeneracy absence. In any case, we are free to choose normalised eigenfunctions…”

“…However, his explanation for such an occurrence, provided at page 738 of his article, is only of mathematical nature. Also, Reif proposed at page 356 of his textbook [22] an interesting problem regarding the motion of a particle on a circumference, again involving periodic (p) boundary conditions therefore, that offers an appropriate scenario to scrutinise the physical meaning of the boundary terms in equation (43)(p); De Vincenzo [36] has discussed classical and quantum descriptions of this problem in details and we refer the interested reader to his well-written paper.…”

Considerations about the incompleteness of the Ehrenfest’s theorem in quantum mechanics

“…Equation (36) is the basis to prove the reality of the eigenvalues and the orthogonality of the eigenfunctions when s = r. If degenerate eigenfunctions turn out to exist then we can make recourse to the Gram-Schmidt recipe [3,8] to orthogonalise them but, for the sake of simplicity, we proceed with the assumption of degeneracy absence. In any case, we are free to choose normalised eigenfunctions…”

“…However, his explanation for such an occurrence, provided at page 738 of his article, is only of mathematical nature. Also, Reif proposed at page 356 of his textbook [22] an interesting problem regarding the motion of a particle on a circumference, again involving periodic (p) boundary conditions therefore, that offers an appropriate scenario to scrutinise the physical meaning of the boundary terms in equation (43)(p); De Vincenzo [36] has discussed classical and quantum descriptions of this problem in details and we refer the interested reader to his well-written paper.…”

Considerations about the incompleteness of the Ehrenfest’s theorem in quantum mechanics