Christian Bogner, Armin Schweitzer, Stefan Weinzierl
Published 2018-07-06Version 1
We consider results for the master integrals of the kite family, given in terms of ELi-functions which are power series in the nome $q$ of an elliptic curve. The analytic continuation of these results beyond the Euclidean region is reduced to the analytic continuation of the two period integrals which define $q.$ We discuss the solution to the latter problem from the perspective of the Picard-Lefschetz formula.
Comments: talk at the KMPB conference "Elliptic Integrals, Elliptic Functions and Modular Forms in Quantum Field Theory", 23-26 October 2017, at DESY Zeuthen
The number of master integrals is finite
Analytic continuation of harmonic sums with imaginary indices near integer values
Master Integrals for Four-Loop Massless Propagators up to Transcendentality Weight Twelve
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