ar X iv : g r - qc / 9 60 70 61 v 1 2 4 Ju l 1 99 6 Homothetic perfect fluid space - times

ar X iv : g r - qc / 0 00 50 66 v 1 1 6 M ay 2 00 0 SELF - SIMILAR PERFECT FLUIDS

Space-times admitting an r-parameter Lie group of homotheties are studied for r > 2 devoting a special attention to those representing perfect fluid solutions to Einstein's field equations. 1 Basic facts about homotheties Throughout this paper (M, g) will denote a space-time: M then being a Haus-dorff, simply connected, four-dimensional manifold, and g a Lorentz metric of signature (-,+,+,+). A...

ar X iv : g r - qc / 9 90 70 33 v 2 1 3 Ju l 1 99 9 Unmissing the Missing Matter in

Uncompactified KK universes are so intrinsically connected to the otherwise only empirically required “missing” Dark Matter (DM),

ar X iv : g r - qc / 9 70 60 59 v 3 1 6 Ju l 1 99 8 Foundation of The Two dimensional Quantum Theory of Gravity

The two dimensional substructure of general relativity and gravity, and the two dimensional geometry of quantum effect by black hole are disclosed. Then the canonical quantization of the two dimensional theory of gravity is performed. It is shown that the resulting uncertainty relations can explain black hole quantum effects. A quantum gravitational length is also derived which can clarify the ...

ar X iv : g r - qc / 9 61 20 09 v 1 3 D ec 1 99 6 Signal analysis of gravitational waves

ar X iv : g r - qc / 9 50 70 03 v 2 2 7 Ju l 1 99 5 A Normal Coordinate Expansion for the Gauge Potential ∗

In this pedagogical note, I present a method for constructing a fully covariant normal coordinate expansion of the gauge potential on a curved space-time manifold. Although the content of this paper is elementary, the results may prove useful in some applications and have not, to the best of my knowledge, been discussed explicitly in the literature.