Lorentzian spectral zeta functions on asymptotically Minkowski spacetimes

Abstract

In this note, we consider perturbations of Minkowski space as well as more general spacetimes on which the wave operator g is essentially self-adjoint. We review a recent result which gives the meromorphic continuation of the Lorentzian spectral zeta function density, i.e. of the trace density of complex powers α (g-i )-α. In even dimension n≥ 4, the residue at n2-1 is shown to be a multiple of the scalar curvature in the limit 0+. This yields a spectral action for gravity in Lorentzian signature.