Symbolic integration of a product of two spherical bessel functions with an additional exponential and polynomial factor

Abstract

We present a mathematica package that performs the symbolic calculation of integrals of the form ∫∞0 e-x/u xn j (x) jμ (x) dx where j (x) and jμ (x) denote spherical Bessel functions of integer orders, with 0 and μ 0. With the real parameter u>0 and the integer n, convergence of the integral requires that n+ +μ 0. The package provides analytical result for the integral in its most simplified form. The novel symbolic method employed enables the calculation of a large number of integrals of the above form in a fraction of the time required for conventional numerical and Mathematica based brute-force methods. We test the accuracy of such analytical expressions by comparing the results with their numerical counterparts.