English

IBIS: Inverse BInomial sum Solver

High Energy Physics - Phenomenology 2025-06-26 v1

Abstract

In higher-loop calculations, Mellin-Barnes representations are used to simplify the denominators encountered in Feynman parameter integrals. The contour integral of these representations yield sums over residues. We extend the classes of such sums that can be calculated, to include those involving inverse binomials. Our results are expressed in terms of so-called SS-sums, where the dependence on the upper limit of the sum is analytic. This is accomplished by deriving several new recursion relations, obtained from telescoping series and repeated synchronization. We make our results available through IBIS ("Inverse BInomial sum Solver"), a FORM program to perform such inverse binomial sums. It expresses them in terms of SS-sums, which can be handled by XSUMMER. To illustrate the efficiency of our code: sums up to weight 6 can be carried out in less than a second. We show in an example how inverse binomial sums arise, though in many instances these are nested with binomial sums, beyond the cases studied here. Our work thus provides a starting point for studying such sums, that will open up new avenues in higher-loop calculations.

Keywords

Cite

@article{arxiv.2506.19904,
  title  = {IBIS: Inverse BInomial sum Solver},
  author = {Paul A. J. W. van Hoegaerden and Coenraad B. Marinissen and Wouter J. Waalewijn},
  journal= {arXiv preprint arXiv:2506.19904},
  year   = {2025}
}

Comments

28 pages including 1 appendix. Associated code available at: https://github.com/cbmarini/IBIS

R2 v1 2026-07-01T03:32:07.717Z