Litcius/Paper detail

Functional relations for elliptic polylogarithms

Johannes Broedel, André Kaderli

2020Journal of Physics A Mathematical and Theoretical28 citationsDOIOpen Access PDF

Abstract

Abstract Numerous examples of functional relations for multiple polylogarithms are known. For elliptic polylogarithms, however, tools for the exploration of functional relations are available, but only very few relations are identified. Starting from an approach of Zagier and Gangl, which in turn is based on considerations about an elliptic version of the Bloch group, we explore functional relations between elliptic polylogarithms and link them to the relations which can be derived using the elliptic symbol formalism. The elliptic symbol formalism in turn allows for an alternative proof of the validity of the elliptic Bloch relation. While the five-term identity is the prime example of a functional identity for multiple polylogarithms and implies many dilogarithm identities, the situation in the elliptic setup is more involved: there is no simple elliptic analogue, but rather a whole class of elliptic identities.

Topics & Concepts

Elliptic rational functionsMathematicsElliptic functionFormalism (music)Quarter periodJacobi elliptic functionsPure mathematicsModular elliptic curveIdentity (music)Algebra over a fieldElliptic integralElliptic curve point multiplicationElliptic curveElliptic operatorSupersingular elliptic curveSimple (philosophy)Symbol (formal)Class (philosophy)Prime (order theory)Mathematical analysisSchoof's algorithmAdvanced Mathematical IdentitiesAdvanced Algebra and GeometryAlgebraic structures and combinatorial models