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A&A 376, 17-27 (2001)
DOI: 10.1051/0004-6361:20010952
Space and observers in cosmology
M. Lachièze-ReyService d'Astrophysique, CE Saclay, 91191 Gif-sur-Yvette Cedex, France
(Received 16 May 2001 / Accepted 29 June 2001 )
Abstract
I provide a prescription to define space, at a given moment,
for an arbitrary observer in an arbitrary (sufficiently regular)
curved space-time. This prescription, based on synchronicity (simultaneity)
arguments, defines a foliation of space-time, which
corresponds to a family of canonically associated observers. It
provides also a natural global reference frame (with space and time coordinates)
for the observer, in space-time (or rather in the part of it which is causally
connected to him), which remains Minkowskian along his world-line. This
definition intends to provide a basis for the problem of
quantization in curved space-time, and/or for non inertial observers.
Application to Minkowski spacetime illustrates clearly the fact that different
observers see different spaces. For example, it allows one to define
space everywhere without ambiguity, for the Langevin observer
(involved in the Langevin pseudoparadox of twins).
Applied to the Rindler observer (with uniform acceleration) it leads
to the Rindler coordinates, whose choice is so justified with a
physical basis. This leads to an interpretation
of the Unruh effect, as due to the observer-dependence of the definition of
space (and time).
This prescription is also applied in cosmology, for inertial observers
in the Friedmann-Lemaître models: space for the observer appears to differ from
the hypersurfaces of homogeneity, which do not obey the simultaneity
requirement. I work out two examples: the Einstein-de Sitter model, in which
space, for an inertial observer, is not flat nor homogeneous, and the
de Sitter case.
Key words: cosmology: muscellaneous -- cosmology: theory
© ESO 2001
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