Abstract

We continue the analysis of modular invariant functions, subject to inhomogeneous Laplace eigenvalue equations, that were determined in terms of Poincaré series in a companion paper. The source term of the Laplace equation is a product of (derivatives of) two non-holomorphic Eisenstein series whence the modular invariants are assigned depth two. These modular invariant functions can sometimes be expressed in terms of single-valued iterated integrals of holomorphic Eisenstein series as they appear in generating series of modular graph forms. We show that the set of iterated integrals of Eisenstein series has to be extended to include also iterated integrals of holomorphic cusp forms to find expressions for all modular invariant functions of depth two. The coefficients of these cusp forms are identified as ratios of their L-values inside and outside the critical strip.

Details

Title
Poincaré series for modular graph forms at depth two. Part II. Iterated integrals of cusp forms
Author
Dorigoni Daniele 1 ; Kleinschmidt Axel 2 ; Schlotterer Oliver 3   VIAFID ORCID Logo 

 Durham University, Lower Mountjoy, Centre for Particle Theory & Department of Mathematical Sciences, Durham, U.K. (GRID:grid.8250.f) (ISNI:0000 0000 8700 0572) 
 Max-Planck-Institut für Gravitationsphysik (Albert-Einstein-Institut), Potsdam, Germany (GRID:grid.450243.4) (ISNI:0000 0001 0790 4262); International Solvay Institutes, Brussels, Belgium (GRID:grid.425224.7) (ISNI:0000 0001 2189 8962) 
 Uppsala University, Department of Physics and Astronomy, Uppsala, Sweden (GRID:grid.8993.b) (ISNI:0000 0004 1936 9457) 
Publication year
2022
Publication date
Jan 2022
Publisher
Springer Nature B.V.
e-ISSN
10298479
Source type
Scholarly Journal
Language of publication
English
DOI
https://doi.org/10.1007/JHEP01(2022)134
ProQuest document ID
2622860895
Copyright
© The Author(s) 2022. This work is published under CC-BY 4.0 (the “License”). Notwithstanding the ProQuest Terms and Conditions, you may use this content in accordance with the terms of the License.