Obstructions to global visibility of singularities in asymptotically flat spacetimes

Abstract

Consider an (N+1)-dimensional asymptotically flat spacetime and a future-directed, affinely parametrized outgoing null generator γ of an achronal boundary ∂ J+(S), where \S\ is a nested family of smooth compact codimension 2 surfaces approaching a singular boundary set S in the past. In the twist-free case and under the null energy condition, the Raychaudhuri equation on the m:=N-1 dimensional screen bundle reads, θ'=-1mθ2-\|σ\|2-Ric(k,k), where k is the tangent to γ. This equation linearizes, via the rescaling u:=A1/m with A := | D| the Jacobi-map m-volume, to the Sturm-type ODE u''+1m f\,u=0, f:=\|σ\|2+Ric(k,k) 0. We develop two purely generator-wise criteria forcing a first zero of u: (i) an exact Volterra identity combined with concavity leads to a barrier-weighted integral inequality, and (ii) Sturm comparison and a Pr\"ufer-angle estimate yields failure of disconjugacy whenever ∫cd f/m\,dλ>π on a subinterval. We prove that u(λ)=0 is equivalent to the existence of a focal (conjugate) point and implies θ= m u'/u-∞ at λ. Using the standard structure of achronal boundaries, this yields a geodesic-wise obstruction: if every generator that could reach I+ satisfies one of the above conditions in the regular spacetime region, then J+(S) I+=, and hence S is not globally visible. As an application, we illustrate one of these criteria in the Einstein-massless scalar field collapse model of Christodoulou.