Kontsevich-Zagier Integrals for Automorphic Green's Functions. I

Abstract

In the framework of Kontsevich-Zagier periods, we derive integral representations for weight-k automorphic Green's functions invariant under modular transformations in 0(N) (N∈ Z≥1 ), provided that there are no cusp forms on the respective Hecke congruence groups with an even integer weight k≥4. These Kontsevich-Zagier integral representations for automorphic Green's functions give explicit formulae for certain Eichler-Shimura maps connecting Eichler cohomology to Maa cusp forms. We construct integral representations for weight-4 Gross-Zagier renormalized Green's functions (automorphic self-energy) from limit scenarios of the respective Kontsevich-Zagier integrals. We reduce the weight-4 automorphic self-energy on X0(4)( C)=0(4) H* to an explicit form, which supports an algebraicity conjecture of Gross and Zagier.