Abstract
In this Brief Report we discuss a solution of the free-particle Schrödinger equation in which the time and space dependence are not separable. The wave function is written as a product of exponential terms, Hermite polynomials, and a phase. The peaks in the wave function decelerate and then accelerate around . We analyze this behavior within both a quantum and a semiclassical regime. We show that the acceleration does not represent true acceleration of the particle but can be related to the envelope function of the allowed classical paths. Comparison with other “accelerating” wave functions is also made. The analysis provides considerable insight into the meaning of the quantum wave function.
- Received 27 July 2012
- Revised 16 January 2014
DOI:https://doi.org/10.1103/PhysRevA.89.044101
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