Approximating functions on ${\mathbb R}^+$ by exponential sums
Numerical Analysis
2026-05-05 v2 Numerical Analysis
Abstract
We present a new method for approximating real-valued functions on by linear combinations of exponential functions with complex coefficients. The approach is based on a multi-point Pad\'e approximation of the Laplace transform and employs a highly efficient continued fraction technique to construct the corresponding rational approximant. We demonstrate the accuracy of this method through a variety of examples, including the Gaussian function, probability density functions of the lognormal and Gompertz-Makeham distributions, the hockey stick and unit step functions, as well as a function arising in the approximation of the gamma and Barnes -functions.
Cite
@article{arxiv.2508.19095,
title = {Approximating functions on ${\mathbb R}^+$ by exponential sums},
author = {Alexey Kuznetsov and Armin Mohammadioroojeh},
journal= {arXiv preprint arXiv:2508.19095},
year = {2026}
}