Mehler-Fock transforms and retarded radiative Green functions on hyperbolic and spherical spaces

TL;DR

This paper develops a constructive approach using generalized Mehler-Fock transforms to explicitly derive retarded Green functions for wave equations on hyperbolic and spherical spaces, clarifying and extending previous results.

Contribution

It introduces a new method for constructing causal Green functions on hyperbolic and spherical spaces via generalized Mehler-Fock transforms, with explicit kernels and analytic continuation techniques.

Findings

Explicit kernels for Green functions on hyperbolic and spherical spaces

Validation of a new generalized Mehler-Fock transformation

Extension of previous theoretical results on Green functions

Abstract

We develop the theory of causal radiation Green functions on hyperbolic and hyperspherical spaces using a constructive approach based on generalized Mehler-Fock transforms. This approach focuses for $H^d$ on the kernel of the transformation expressed in terms of hyperbolic angles $\theta$ with $0\leq\theta<\infty$. The kernel provides an explicit representation for the generalized delta distribution which acts as the source term for the radiation, and allows easy implementation of the causality or retardation condition and determination of the Green function. We obtain the corresponding kernel distribution on $S^d$ by analytic continuation of the kernel distribution of the Helmholtz equation on $H^d$, then show that this construction leads to the proper retarded Green function for the wave equation. That result is then used to establish the validity of a new generalized Mehler-Fock transformation for $0\leq\theta<\pi$. The present results clarify and extend those obtained recently by Cohl, Dang, and Dunster.