In the present work the problem of distinguishing between essential and spurious (i.e., absorbable) constants contained in a metric tensor field in a Riemannian geometry is considered. The contribution of the study is the presentation of a sufficient and necessary criterion, in terms of a covariant statement, which enables one to determine whether a constant is essential or not. It turns out that the problem of characterization is reduced to that of solving a system of partial differential equations of the first order. In any case, the metric tensor field is assumed to be smooth with respect to the constant to be tested. It should be stressed that the entire analysis is purely of local character.
REFERENCES
1.
H.
Stephani
, D.
Kramer
, M.
MacCallum
, C.
Hoenselaers
, and E.
Hertl
, Exact Solutions of Einstein’s Field Equations
, 2nd ed. (Cambridge University Press
, Cambridge, 2003
).2.
R.
Geroch
, Commun. Math. Phys.
13
, 180
(1969
);or for a coordinate-free approach,
F. M.
Paiva
, M. J.
Rebouças
, and M. A. H.
MacCallum
, Class. Quantum Grav.
10
, 1165
(1993
).3.
W.
Kundt
, in Recent Developments in General Relativity
(Pergamon Press
, New York, 1962
), p. 307
;W.
Kundt
, in Les Theories Relativistes de la Gravitation
(Centre National de la Recherche Scientifique
, Paris, 1962
), p. 155
.4.
S. W.
Hawking
and G. F. R.
Ellis
, The Large Scale Structure of Space–Time
(Cambridge University Press
, Cambridge, 1973
).5.
© 2006 American Institute of Physics.
2006
American Institute of Physics
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