Causality conditions Lorentzian manifold spacetimes there exists a hierarchy of causality conditions which are important in proving mathematical theorems about the global structure of such manifolds. These conditions were collected during the late 1970s.spacetime , the more unphysical the spacetime is. Spacetimes with closed timelike curves , for example, present severe interpretational difficulties. See the grandfather paradox .global hyperbolicity . For such spacetimes the equations in general relativity can be posed as an initial value problem on a Cauchy surface .The hierarchy There is a hierarchy of causality conditions, each one of which is strictly stronger than the previous. This is sometimes called the causal ladder . The conditions, from weakest to strongest, are:Notation : denotes the chronological relation . denotes the causal relation .Non-totally vicious For some points we have.Chronological There are no closed chronological curves. The chronological relation is irreflexive: for all.Causal There are no closed causal curves. If both and thenDistinguishing Past-distinguishing Two points which share the same chronological past are the same point: For any neighborhood of there exists a neighborhood such that no past-directed non-spacelike curve from intersects more than once.Future-distinguishing Two points which share the same chronological future are the same point: For any neighborhood of there exists a neighborhood such that no future-directed non-spacelike curve from intersects more than once.Strongly causal For any neighborhood of there exists a neighborhood such that there exists no timelike curve that passes through more than once. For any neighborhood of there exists a neighborhood such that is causally convex in . The Alexandrov topology agrees with the manifold topology .Stably causal perturbation . A spacetime is stably causal if it cannot be made to contain closed causal curves by arbitrarily small perturbations of the metric. Stephen Hawking showed that this is equivalent to:Robert Geroch showed that a spacetime is globally hyperbolic if and only if there exists a Cauchy surface for. This means that:
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