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Elliptic modular graph forms. Part I. Identities and generating series

Eric D’Hoker, Axel Kleinschmidt, Oliver Schlotterer

2021Journal of High Energy Physics17 citationsDOIOpen Access PDF

Abstract

A bstract Elliptic modular graph functions and forms (eMGFs) are defined for arbitrary graphs as natural generalizations of modular graph functions and forms obtained by including the character of an Abelian group in their Kronecker-Eisenstein series. The simplest examples of eMGFs are given by the Green function for a massless scalar field on the torus and the Zagier single-valued elliptic polylogarithms. More complicated eMGFs are produced by the non-separating degeneration of a higher genus surface to a genus one surface with punctures. eMGFs may equivalently be represented by multiple integrals over the torus of combinations of coefficients of the Kronecker-Eisenstein series, and may be assembled into generating series. These relations are exploited to derive holomorphic subgraph reduction formulas, as well as algebraic and differential identities between eMGFs and their generating series.

Topics & Concepts

TorusAbelian groupPure mathematicsMathematicsTheta functionScalar (mathematics)PhysicsModular elliptic curveModular designModular formEisenstein seriesGraph propertyAlgebraic numberRiemann surfaceGraphDiscrete mathematicsAlgebra over a fieldCombinatoricsScalar fieldGenerating functionVoltage graphModular groupGenusHolomorphic functionLine graphModular invarianceModular decompositionAlgebraic Geometry and Number TheoryAlgebraic structures and combinatorial modelsAdvanced Algebra and Geometry