Definite integral of a Laguerre polynomial and exponentials

Abstract

In our investigations on the effect of strong magnetic fields on the properties of elementary particles we have been faced with a definite integral of the form ∫02πdθ\ Ln(s2+t2+2stθ)\ e-ikθ\, (-st\,eiθ)\ , where Ln(x) is a Laguerre polynomial, s and t are real numbers and n and k are integers, with n ≥ 0. In the present article we show that this integral can be solved analytically. The result can be used to get an alternative proof of an addition formula for Laguerre polynomials.