Beyond endoscopy for GL2 over Q with ramification 4: contribution of non-elliptic parts

Abstract

We continue our work on GL2 over Q in the ramified setting for Beyond Endoscopy. We establish asymptotic formulas for each term of the trace formula when summing over n<X, using arbitrary smooth test functions at the places in S=\∞,q1,…, qr\ where 2∈ S, for the standard representation, up to an error of o(X). This yields an identity depending on a parameter X, leading to certain identities that can be regarded as a limit form of the trace formula for GL2 over Q. On the spectral side, we employ the contour shift method and the Riemann-Lebesgue lemma. On the geometric side, both the identity part and the unipotent part contribute o(X). The elliptic part was reduced to the hyperbolic part in a previous paper. Finally, using hyperbolic Poisson summation, we relate the hyperbolic part back to the spectral side and determine its contribution.