Translation matrix elements for spherical Gauss-Laguerre basis functions

Abstract

Spherical Gauss-Laguerre (SGL) basis functions, i.e., normalized functions of the type Ln-l-1(l + 1/2)(r2) rl Ylm(,φ), |m| ≤ l < n ∈ N, constitute an orthonormal polynomial basis of the space L2 on R3 with radial Gaussian weight (-r2). We have recently described reliable fast Fourier transforms for the SGL basis functions. The main application of the SGL basis functions and our fast algorithms is in solving certain three-dimensional rigid matching problems, where the center is prioritized over the periphery. For this purpose, so-called SGL translation matrix elements are required, which describe the spectral behavior of the SGL basis functions under translations. In this paper, we derive a closed-form expression of these translation matrix elements, allowing for a direct computation of these quantities in practice.