Uniqueness theorem for BMS-invariant states of scalar QFT on the null boundary of asymptotically flat spacetimes and bulk-boundary observable algebra correspondence

Abstract

Scalar BMS-invariant QFT defined on the causal boundary of an asymptotically flat spacetime is discussed. (a)(i) It is noticed that the natural BMS invariant pure quasifree state λ on (), recently introduced by Dappiaggi, Moretti an Pinamonti, enjoys positivity of the self-adjoint generator of u-translations with respect to every Bondi coordinate frame (u,,) on , u∈ being the affine parameter of the null geodesics forming . This fact may be interpreted as a remnant of spectral condition inherited from Minkowski spacetime. (ii) It is proved cluster property under u-displacements holds for u-invariant pure state on (). (iii) It is proved that there is a unique algebraic pure quasifree state invariant under u-displacements (of a fixed Bondi frame) having positive self-adjoint generator of u-displacements. It coincides with the GNS-invariant state λ.(iv) It is showed that in the folium of a pure u-invariant state ω (not necessarily quasifree) on (), ω is the only state invariant under u-displacement. (b) It is proved that the theory can formulated for spacetimes asymptotically flat at null infinity which admit future time completion. In this case a *-isomorphism exists which identifies the (Weyl) algebra of observables of linear fields in the bulk with a sub algebra of (). A preferred state on the field algebra in the bulk is induced by the BMS-invariant state λ.

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