Litcius/Paper detail

Loop-by-loop differential equations for dual (elliptic) Feynman integrals

Mathieu Giroux, Andrzej Pokraka

2023Journal of High Energy Physics39 citationsDOIOpen Access PDF

Abstract

A bstract We present a loop-by-loop method for computing the differential equations of Feynman integrals using the recently developed dual form formalism. We give explicit prescriptions for the loop-by-loop fibration of multi-loop dual forms. Then, we test our formalism on a simple, but non-trivial, example: the two-loop three-mass elliptic sunrise family of integrals. We obtain an ε -form differential equation within the correct function space in a sequence of relatively simple algebraic steps. In particular, none of these steps relies on the analysis of q -series. Then, we discuss interesting properties satisfied by our dual basis as well as its simple relation to the known ε -form basis of Feynman integrands. The underlying K3-geometry of the three-loop four-mass sunrise integral is also discussed. Finally, we speculate on how to construct a “good” loop-by-loop basis at three-loop.

Topics & Concepts

Loop (graph theory)Feynman diagramMathematicsFormalism (music)Differential equationFibrationLoop spaceBasis (linear algebra)Elliptic integralMathematical analysisMathematical physicsPure mathematicsGeometryCombinatoricsMusicalArtVisual artsHomotopyBlack Holes and Theoretical PhysicsPolynomial and algebraic computationAlgebraic Geometry and Number Theory
Loop-by-loop differential equations for dual (elliptic) Feynman integrals | Litcius