A Paley–Wiener Theorem for the Mehler–Fock Transform

In this note, we prove a Paley–Wiener Theorem for the Mehler–Fock transform. In particular, we show that it induces an isometric isomorphism from the Hardy space ℋ^2(ℂ^+) onto L^2(ℝ^+,( 2 π )^-1 t sinh (π t) dt ) . The proof we provide here is very simple and is based on an old idea that seems to be due to G. R. Hardy. As a consequence of this Paley–Wiener theorem we also prove a Parseval’s theorem. In the course of the proof, we find a formula for the Mehler–Fock transform of some particular functions.