Form-preserving transformations of wave and Wigner functions

TL;DR

This paper reviews and extends form-preserving transformations of wave and Wigner functions in quantum mechanics, demonstrating their ability to generate solutions with unique properties and providing explicit transformation formulas in phase space.

Contribution

It introduces a comprehensive framework for form-preserving transformations in Schrödinger equations, including phase space mappings and their applications to various quantum states.

Findings

Transformations produce solutions with surprising properties like Airy beams.

Explicit formulas for wave-function and Wigner function transformations are derived.

The framework generalizes known solutions and includes phase space mappings.

Abstract

Solutions of the time-dependent Schr\"odinger equation are mapped to other solutions for a (possibly) different potential by so-called form-preserving transformations. These time-dependent transformations of the space and time coordinates can produce remarkable solutions with surprising properties. A classic example is the force-free accelerating Airy beam found by Berry and Balazs. We review the 1-dimensional form-preserving transformations and show that they also yield Senitzky coherent excited states and the free dispersion of any harmonic-oscillator stationary state. Form preservation of the $D$- and 3-dimensional Schr\"odinger equation with both a scalar and a vector potential is then considered. Time-dependent rotations may be included when a vector potential is present; we find a general transformation formula for this case. Quantum form-preserving maps are also considered in phase space. First, the wave-function transformation is shown to produce a simple result for Wigner functions: they transform as a true phase-space probability would. The explicit transformation formula explains and generalizes the rigid evolution of curves in phase space that characterize the Airy beam and the coherent excited states. Then we recover the known form-preserving transformations from the Moyal equation obeyed by Wigner functions.