Quantum GravitySpectral ZetaLoop QG
Mann’s Spectral Zeta Experiment
Testing whether zeros of the quantum gravity spectral zeta function ζQG(s) = Σ λn−s concentrate on the critical line Re(s) = ½, where λn = α·√(j·(j+1)) are eigenvalues of the LQG area operator.
Mann’s Hypothesis (M1): The non-trivial zeros of ζQG(s) lie on Re(s) = ½ if and only if quantum gravity is consistent and black holes exist as discrete thermodynamic objects. This numerical experiment provides heuristic evidence — not a proof.