On the wave functions of a covariant linear oscillator (Q1804141)

The authors find a \(q\)-extension of the facts that \(H_n (x) e^{- x^2/2}\) are eigenfunctions of the Fourier transform. Here they use the classical Fourier transform and weighting factor \(e^{-x^2/2}\), but use the continuous \(q\)-Hermite polynomials. On one side the case \(0< q< 1\) occurs, while on the other it is this function with \(q\) replaced by \(q^{-1}\) and \(x\) replaced by \(ix\). Other results are also given, including the orthogonality when \(1< q<1\), which is rewritten in a different way.