Litcius/Paper detail

Intersection numbers from companion tensor algebra

Giacomo Brunello, Vsevolod Chestnov, Pierpaolo Mastrolia

2025Journal of High Energy Physics10 citationsDOIOpen Access PDF

Abstract

A bstract Twisted period integrals are ubiquitous in theoretical physics and mathematics, where they inhabit a finite-dimensional vector space governed by an inner product known as the intersection number. In this work, we uncover the associated tensor structures of intersection numbers and integrate them with the fibration method to develop a novel evaluation scheme. Companion matrices allow us to cast the computation of the intersection numbers in terms of a matrix operator calculus within the ambient tensor space. For illustrative purposes, our algorithm has been successfully applied to the numerical decomposition of a sample of two-loop integrals, coming from planar five-point massless functions, representing a significant advancement for the direct projection of Feynman integrals to master integrals via intersection numbers.

Topics & Concepts

Tensor productMathematicsIntersection (aeronautics)Algebra over a fieldTensor (intrinsic definition)Vector spaceProjection (relational algebra)Tensor contractionTensor calculusTensor algebraMatrix (chemical analysis)ComputationTensor fieldPure mathematicsMathematical analysisAlgorithmExact solutions in general relativityComposite materialMaterials scienceAerospace engineeringCurrent algebraEngineeringJordan algebraPolynomial and algebraic computationTensor decomposition and applicationsCoding theory and cryptography