Pseudo-differential operators of infinite order on \(W^{\Omega}_{M}(\mathbb C^{n})\)-space involving fractional Fourier transform (Q2345378)

In this paper, the theory of the space \(W_M^\Omega (\mathbb C^n)\) is developed by virtue of pseudo-differential operators involving the \(n\)-dimensional fractional Fourier transform. The properties of pseudo-differential operators are proposed and proved, but more importantly, the authors prove that the pseudo-differential operator continuously maps the space \(W_M^\Omega (\mathbb C^n)\) into itself. The \(L^p (\mathbb R^n)\) boundedness is also reported for the same space. In the reviewer's opinion, the authors have opened a new branch in the area of pseudo-differential operators of infinite order for researchers who are working in this field.