Series expansion for the Fourier transform of a rational function in three dimensions

Abstract

In Rashba-Dresselhaus spin-orbit coupled systems, the calculation of Green's function requires the knowledge of the inverse Fourier transform of rational function P(p)/Q(p), where P(p) takes the values 1 and p2, and where \[ Q(p)=(p2-ζ)2- α2(p12+p22)-β2 \] with suitable parameters α, β≥0, ζ∈C. While a two-dimensional problem, with p=(p1,p2), has been recently solved [J. Br\"uning et al, J. Phys. A: Math. Theor. 40 (2007)], its three-dimensional analogue, with p=(p1,p2,p3), remains open. In this paper, a hypergeometric series expansion for the triple integral is provided. Convergence of the series dependent on the parameters is studied in detail.