Pseudo-differential operator associated with the fractional Fourier transform (Q2815915)

The fractional Fourier transform \(F^\theta\) depending on rotation by the angle \(\theta\) in the time-frequency plane was introduced by \textit{V. Namias} [J. Inst. Math. Appl. 25, 241--265 (1980; Zbl 0434.42014)]. The case \(\theta=\pi/2\) corresponds to the usual Fourier transform on the real line. The goal of the paper is to study the action of \(F^\theta\) on the Schwartz space of rapidly decreasing smooth functions, the relevant convolution operators and more general pseudo-differential operators in Sobolev spaces. The corresponding generalized Fredholm integral equations of the convolution type are considered.