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arxiv: gr-qc/9612005 · v1 · pith:ZVYJ3UNZnew · submitted 1996-12-02 · 🌀 gr-qc

A Local Variational Theory for the Schmidt metric

classification 🌀 gr-qc
keywords b-lengthcausalcurvecurvesfuturetheoryclustergeodesics
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We study local variations of causal curves in a space-time with respect to b-length (or generalised affine parameter length). In a convex normal neighbourhood, causal curves of maximal metric length are geodesics. Using variational arguments, we show that causal curves of minimal b-length in sufficiently small globally hyperbolic sets are geodesics. As an application we obtain a generalisation of a theorem by B. G. Schmidt, showing that the cluster curve of a partially future imprisoned, future inextendible and future b-incomplete curve must be a null geodesic. We give examples which illustrate that the cluster curve does not have to be closed or incomplete. The theory of variations developed in this work provides a starting point for a Morse theory of b-length.

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