Globally Hyperbolic Manifold

In mathematical physics, global hyperbolicity is a certain condition on the causal structure of a spacetime manifold (that is, a Lorentzian manifold). It's called hyperbolic because the fundamental condition that generates the Lorentzian manifold is
* $t^2 - r^2 = T^2$
(t and r being the usual variables of time and radius) which is one of the usual equations representing an hyperbola. But this expression is only true relative to the ordinary origin; this article then outline bases for generalizing the concept to any pair of points in spacetime.
This is relevant to Albert Einstein's theory of general relativity, and potentially to other metric gravitational theories.

Definitions

There are several equivalent definitions of global hyperbolicity. Let ''M'' be a smooth connected Lorentzian manifold without boundary. We make the following preliminary definitions:
* ''M'' is ''non-totally vicious'' if there is at least one point such that no closed timelike curve passes through it.
* ''M'' is ''causal'' if it has no closed causal curves.
* ''M'' is ''non-total imprisoning'' if no inextendible causal curve is contained in a compact set. This property implies causality.
* ''M'' is ''strongly causal'' if for every point ''p'' and any neighborhood ''U'' of ''p'' there is a causally convex neighborhood ''V'' of ''p'' contained in ''U'', where causal convexity means that any causal curve with endpoints in ''V'' is entirely contained in ''V''. This property implies non-total imprisonment.
* Given any point ''p'' in ''M'', $J^+(p)$ esp. $J^-(p)$is the collection of points which can be reached by a future-directed esp. past-directedcontinuous causal curve starting from ''p''.
* Given a subset ''S'' of ''M'', the ''domain of dependence'' of ''S'' is the set of all points ''p'' in ''M'' such that every inextendible causal curve through ''p'' intersects ''S''.
* A subset ''S'' of ''M'' is ''achronal'' if no timelike curve intersects ''S'' more than once.
* A ''Cauchy surface'' for ''M'' is a closed achronal set whose domain of dependence is ''M''.
The following conditions are equivalent:
# The spacetime is causal, and for every pair of points ''p'' and ''q'' in ''M'', the space of continuous future-directed causal curves from ''p'' to ''q'' is compact in the $\mathcal^0$ topology.
# The spacetime has a Cauchy surface.
# The spacetime is causal, and for every pair of points ''p'' and ''q'' in ''M'', the subset $J^-(p)\cap J^+(q)$ is compact.
# The spacetime is non-total imprisoning, and for every pair of points ''p'' and ''q'' in ''M'', the subset $$ is contained in a compact set (that is, its closure is compact).
If any of these conditions are satisfied, we say ''M'' is ''globally hyperbolic''. If ''M'' is a smooth connected Lorentzian manifold with boundary, we say it is globally hyperbolic if its interior is globally hyperbolic.

Other equivalent characterizations of global hyperbolicity make use of the notion of Lorentzian distance $d(p,q):=\sup_\gamma l(\gamma)$ where the supremum is taken over all the $C^1$ causal curves connecting the points (by convention d=0 if there is no such curve). They are
* A strongly causal spacetime for which $d$ is finite valued.J. K. Beem, P. E. Ehrlich, and K. L. Easley, "Global Lorentzian Geometry". New York: Marcel Dekker Inc. (1996).
* A non-total imprisoning spacetime such that $d$ is continuous for every metric choice in the conformal class of the original metric.

Remarks

Global hyperbolicity, in the first form given above, was introduced by LerayJean Leray, "Hyperbolic Differential Equations." Mimeographed notes, Princeton, 1952. in order to consider well-posedness of the Cauchy problem for the wave equation on the manifold. In 1970 GerochRobert P. Geroch, "Domain of dependence", '' Journal of Mathematical Physics'' 11, (1970) 437, 13pp proved the equivalence of definitions 1 and 2. Definition 3 under the assumption of strong causality and its equivalence to the first two was given by Hawking and Ellis.Stephen Hawking and George Ellis, "The Large Scale Structure of Space-Time". Cambridge: Cambridge University Press (1973).

As mentioned, in older literature, the condition of causality in the first and third definitions of global hyperbolicity given above is replaced by the stronger condition of ''strong causality''. In 2007, Bernal and SánchezAntonio N. Bernal and Miguel Sánchez, "Globally hyperbolic spacetimes can be defined as 'causal' instead of 'strongly causal'", ''Classical and Quantum Gravity'' 24 (2007), no. 3, 745–74

/ref> showed that the condition of strong causality can be replaced by causality. In particular, any globally hyperbolic manifold as defined in 3 is strongly causal. Later Hounnonkpe and Minguzzi Raymond N. Hounnonkpe and Ettore Minguzzi, "Globally hyperbolic spacetimes can be defined without the ‘causal’ condition", ''Classical and Quantum Gravity'' 36 (2019), 19700

/ref> proved that for quite reasonable spacetimes, more precisely those of dimension larger than three which are non-compact or non-totally vicious, the 'causal' condition can be dropped from definition 3.

In definition 3 the closure of $J^-(p)\cap J^+(q)$ seems strong (in fact, the closures of the sets $J^\pm(p)$ imply ''causal simplicity'', the level of the causal hierarchy of spacetimesE. Minguzzi and M. Sánchez, "The Causal Hierarchy of Spacetimes", in Recent developments in pseudo-Riemannian
geometry of ESI Lect. Math. Phys., edited by Helga Baum, H. Baum and D. Alekseevsky (European Mathematical Society Publishing
House (EMS), Zurich, 2008), p. 29

/ref> which stays just below global hyperbolicity). It is possible to remedy this problem strengthening the causality condition as in definition 4 proposed by MinguzziEttore Minguzzi, "Characterization of some causality conditions through the continuity of the Lorentzian distance", '' Journal of Geometry and Physics'' 59 (2009), 827–83

/ref> in 2009. This version clarifies that global hyperbolicity sets a compatibility condition between the causal relation and the notion of compactness: every causal diamond is contained in a compact set and every inextendible causal curve escapes compact sets. Observe that the larger the family of compact sets the easier for causal diamonds to be contained on some compact set but the harder for causal curves to escape compact sets. Thus global hyperbolicity sets a balance on the abundance of compact sets in relation to the causal structure. Since finer topologies have less compact sets we can also say that the balance is on the number of open sets given the causal relation.
Definition 4 is also robust under perturbations of the metric (which in principle could introduce closed causal curves). In fact using this version it has been shown that global hyperbolicity is stable under metric perturbations.J.J. Benavides Navarro and E. Minguzzi, "Global hyperbolicity is stable in the interval topology", '' Journal of Mathematical Physics'' 52 (2011), 112504

/ref>

In 2003, Bernal and SánchezAntonio N. Bernal and Miguel Sánchez, " On smooth Cauchy hypersurfaces and Geroch's splitting theorem", '' Communications in Mathematical Physics'' 243 (2003), no. 3, 461–47

/ref> showed that any globally hyperbolic manifold ''M'' has a smooth embedded three-dimensional Cauchy surface, and furthermore that any two Cauchy surfaces for ''M'' are diffeomorphic. In particular, ''M'' is diffeomorphic to the product of a Cauchy surface with $\mathbb$. It was previously well known that any Cauchy surface of a globally hyperbolic manifold is an embedded three-dimensional $C^0$ submanifold, any two of which are homeomorphic, and such that the manifold splits topologically as the product of the Cauchy surface and $\mathbb$. In particular, a globally hyperbolic manifold is foliated by Cauchy surfaces.

In view of the Initial value formulation (general relativity), initial value formulation for Einstein's equations, global hyperbolicity is seen to be a very natural condition in the context of general relativity, in the sense that given arbitrary initial data, there is a unique maximal globally hyperbolic solution of Einstein's equations.

See also

* Causality conditions
* Causal structure
* Light cone

References

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General relativity
Mathematical methods in general relativity
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