Causality and Conjugate Points in General Plane Waves

Abstract

Let M = M0 × 2 be a pp--wave type spacetime endowed with the metric <·,·>z = <·,·>x + 2 du dv + H(x,u) du2, where (M0, <·,·>x) is any Riemannian manifold and H(x,u) an arbitrary function. We show that the behaviour of H(x,u) at spatial infinity determines the causality of M, say: (a) if -H(x,u) behaves subquadratically (i.e, essentially -H(x,u) ≤ R1(u) |x|2-ε for some ε >0 and large distance |x| to a fixed point) and the spatial part (M0, <·,·>x) is complete, then the spacetime M is globally hyperbolic, (b) if -H(x,u) grows at most quadratically (i.e, -H(x,u) ≤ R1(u) |x|2 for large |x|) then it is strongly causal and (c) M is always causal, but there are non-distinguishing examples (and thus, non-strongly causal), even when -H(x,u) ≤ R1(u) |x|2+ε , for small ε >0. Therefore, the classical model M0 = 2, H(x,u) = Σi,j hij(u) xi xj ( 0), which is known to be strongly causal but not globally hyperbolic, lies in the critical quadratic situation with complete M0. This must be taken into account for realistic applications. In fact, we argue that -H will be subquadratic (and the spacetime globally hyperbolic) if M is asymptotically flat. The relation of these results with the notion of astigmatic conjugacy and the existence of conjugate points is also discussed.

0

Turn this paper into a full lesson

ArcXiv compiles a staged curriculum from this paper: 8-12 lessons across beginner → advanced, synthesised section guides, visuals, flashcards, a quiz, exercises, and on-demand deep dives per section. Grounded in the abstract, never invented.

Discussion (0)

Sign in to join the discussion.

Loading comments…