Differential equations in automorphic forms

Abstract

Physicists such as Green, Vanhove, et al show that differential equations involving automorphic forms govern the behavior of gravitons. One particular point of interest is solutions to (-λ)u=Eα Eβ on an arithmetic quotient of the exceptional group E8. We establish that the existence of a solution to (-λ)u=EαEβ on the simpler space SL2(Z) SL2(R) for certain values of α and β depends on nontrivial zeros of the Riemann zeta function ζ(s). Further, when such a solution exists, we use spectral theory to solve (-λ)u=EαEβ on SL2(Z) SL2(R) and provide proof of the meromorphic continuation of the solution. The construction of such a solution uses Arthur truncation, the Maass-Selberg formula, and automorphic Sobolev spaces.