The θ= ∞ Conjecture and the Riemann Hypothesis for Automorphic L-functions

Abstract

The θ=∞ conjecture asserts that the mollified second moments of the Riemann zeta function remain bounded for mollifiers of arbitrary polynomial length. We investigate an analogue of this conjecture for automorphic L-functions associated with cuspidal representations of GLm(AQ), exploring its implications for the distribution of their nontrivial zeros. Extending the framework of Bettin and Gonek, we prove that if the mollified second moments of these L-functions remain suitably bounded for mollifiers of arbitrary polynomial length, then the L-functions are non-vanishing in corresponding regions of the critical strip. Furthermore, we establish a version of this criterion for families of L-functions, demonstrating that the θ= ∞ conjecture for a family of L-functions implies a quasi-Riemann Hypothesis for that family.