Spectral Admissibility of Real Observers in Euclidean de Sitter Gravity

Abstract

The Euclidean de Sitter path integral contains the familiar phase associated with conformal negative modes. Maldacena's construction shows that a suitably included real observer can reorganize the refined state-counting problem. This paper does not rederive that cancellation. It addresses the prior semiclassical admissibility question: which observer sectors couple to the de Sitter saddle as genuine metric observers without becoming spectators or producing infrared-singular backreaction? On SD, after gauge fixing and zero-mode projection, the observer's quadratic influence is governed by a Schur complement. We formulate a form-domain criterion: if the observer kernel is positive and the mixed metric-observer source is bounded after applying ΔΦΦ-1/2, the induced metric correction is a bounded quadratic-form perturbation on the chosen channel. In the gapped case, ΔΦΦ≥ m*21 gives \|K ΔΦΦ-1 K\| op ≤ \|K\| op2/m*2; metric-coupled soft modes produce corrections growing as 1/. We prove a sufficiency theorem: on any stable channel with coercive form QggP ≥ δP \|h\|2, the Gaussian saddle remains controlled whenever \|ΔΦΦ-1/2 jP\| op2 < δP. We construct a localized gapped clock-detector with internal oscillators on a smeared worldline that satisfies the criterion with a computable bound and gives explicit S4 benchmark versus the round-sphere TT scale. The conformal channel is treated only as an indefinite or contour-defined sector; boundedness does not imply positivity. The criterion identifies the semiclassically admissible observer class. Phase cancellation follows only when this class overlaps the relevant conformal or negative-mode sector and is combined with an independent contour or state-counting prescription.