Three-loop contributions to the ρ parameter and iterated integrals of modular forms
Samuel Abreu, Matteo Becchetti, Claude Duhr, Robin Marzucca
Abstract
A bstract We compute fully analytic results for the three-loop diagrams involving two different massive quark flavours contributing to the ρ parameter in the Standard Model. We find that the results involve exactly the same class of functions that appears in the well-known sunrise and banana graphs, namely elliptic polylogarithms and iterated integrals of modular forms. Using recent developments in the understanding of these functions, we analytically continue all the iterated integrals of modular forms to all regions of the parameter space, and in each region we obtain manifestly real and fast-converging series expansions for these functions.
Topics & Concepts
PhysicsIterated functionModular designClass (philosophy)Modular formSeries (stratigraphy)Pure mathematicsAlgebra over a fieldParticle physicsFeynman integralOrder of integration (calculus)QuarkTheta functionParametrization (atmospheric modeling)Elliptic integralEisenstein seriesQuantum chromodynamicsTheoretical physicsElliptic curveMathematical physicsCore modelElliptic functionBlack Holes and Theoretical PhysicsAdvanced Mathematical IdentitiesParticle physics theoretical and experimental studies