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 $$\int_0^{2π}dθ L_{n}(s^2+t^2+2st\cosθ)\ e^{-ikθ}\, \exp{(-st\,e^{iθ})}\ , $$ where $L_n(x)$ is a Laguerre polynomial, $s$ and $t$ are real numbers and $n$ and $k$ are integers, with $n \geq 0$. 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.