English

Loops, Polytopes and Splines

High Energy Physics - Theory 2015-06-11 v3 Mathematical Physics math.MP

Abstract

We uncover an unexpected connection between the physics of loop integrals and the mathematics of spline functions. One loop integrands are Laplace transforms of splines. This clarifies the geometry of the associated loop integrals, since a nn-node spline has support on an nn-vertex polyhedral cone. One-loop integrals are integrals of splines on a hyperbolic slice of the cone, yielding polytopes in AdSAdS space. Splines thus give a geometrical counterpart to the rational function identities at the level of the integrand. Spline technology also allows for a clear, simple, algebraic decomposition of higher point loop integrals in lower dimensional kinematics in terms of lower point integrals - e.g. an hexagon integral in 2d kinematics can be written as a sum of scalar boxes. Higher loops can also be understood directly in terms of splines - they map onto spline convolutions, leading to an intriguing representation in terms of hyperbolic simplices integrated over other hyperbolic simplices. We finish with speculations on the interpretation of one-loop integrals as partition functions, inspired by the use of splines in counting points in polytopes.

Keywords

Cite

@article{arxiv.1210.0578,
  title  = {Loops, Polytopes and Splines},
  author = {Miguel F. Paulos},
  journal= {arXiv preprint arXiv:1210.0578},
  year   = {2015}
}

Comments

34 pages. Typos corrected, added references

R2 v1 2026-06-21T22:14:17.159Z