Dr Lorenzo Tancredi

Elliptic polylogarithms and iterated integrals on elliptic curves. Part I: general formalism

Journal of High Energy Physics Springer Nature 2018:5 (2018) 93

Authors:

Johannes Broedel, Claude Duhr, Falko Dulat, Lorenzo Tancredi

Higher order corrections to mixed QCD-EW contributions to Higgs boson production in gluon fusion

Physical Review D American Physical Society (APS) 97:5 (2018) 056017

Authors:

Marco Bonetti, Kirill Melnikov, Lorenzo Tancredi

Three-loop mixed QCD-electroweak corrections to Higgs boson gluon fusion

Physical Review D American Physical Society (APS) 97:3 (2018) 034004

Authors:

Marco Bonetti, Kirill Melnikov, Lorenzo Tancredi

Cuts and Feynman amplitudes beyond polylogarithms

Proceedings of Science 303 (2018)

Authors:

J Broedel, C Duhr, F Dulat, B Penante, A Primo, L Tancredi

Abstract:

In this contribution to the proceedings of Loops and Legs in Quantum Field Theory 2018, we discuss some recent developments in the calculation of multiloop Feynman integrals which evaluate to functions beyond multiple polylogarithms.

Elliptic polylogarithms and two-loop Feynman integrals

Proceedings of Science 303 (2018)

Authors:

J Broedel, C Duhr, F Dulat, B Penante, L Tancredi

Abstract:

We review certain classes of iterated integrals that appear in the computation of Feynman integrals that involve elliptic functions. These functions generalise the well-known class of multiple polylogarithms to elliptic curves and are closely related to the elliptic multiple polylogarithms (eMPLs) studied in the mathematics literature. When evaluated at certain special values of the arguments, eMPLs reduce to another class of special functions, defined as iterated integrals of Eisenstein series. As a novel application of our formalism, we illustrate how a class of special functions introduced by Remiddi and one of the authors can always naturally be expressed in terms of either eMPLs or iterated integrals of Eisenstein series for the congruence subgroup Γ(6).