Affiliation:
1. Institutionen för Matematiska vetenskaper Chalmers tekniska högskola och Göteborgs Universitet Gothenburg Sweden
Abstract
AbstractGiven cusp forms and of integral weight , the depth two holomorphic iterated Eichler–Shimura integral is defined by , where is the Eichler integral of and are formal variables. We provide an explicit vector‐valued modular form whose top components are given by . We show that this vector‐valued modular form gives rise to a scalar‐valued iterated Eichler integral of depth two, denoted by , that can be seen as a higher depth generalization of the scalar‐valued Eichler integral of depth one. As an aside, our argument provides an alternative explanation of an orthogonality relation satisfied by period polynomials originally due to Paşol–Popa. We show that can be expressed in terms of sums of products of components of vector‐valued Eisenstein series with classical modular forms after multiplication with a suitable power of the discriminant modular form . This allows for effective computation of .
Reference19 articles.
1. A.Ahlbäck T.Magnusson andM.Raum Eichler integrals and generalized second order Eisenstein series arXiv: 2203.15462[math] 2022.
2. A class of non‐holomorphic modular forms;Brown F.;I. Res. Math. Sci.,2018
3. A CLASS OF NONHOLOMORPHIC MODULAR FORMS II: EQUIVARIANT ITERATED EISENSTEIN INTEGRALS
4. F.Brown Multiple modular values and the relative completion of the fundamental group ofM1 1$\mathcal {M}_{1 1}$ arXiv: 1407.5167[math] 2017.
5. Integral of two-loop modular graph functions