Russell E. Rierson
Jul26-04, 02:55 AM
I have been reading that the quantity called "Weyl curvature" can exist independently of any matter, or energy, in the universe? :confused:
This seems to contradict Heisenberg uncertainty which says there can be no 100% vacuum, because uncertainty in position and uncertainty in momentum must be greater than zero:
DxDp >= [Planck's constant]/[2*pi]
Mach's principle seems to say that the distribution of matter-energy determines the geometry of space-time, and if there is no matter-energy then there is no geometry.
The Weyl tensor vanishes for a constant curvature if there are no
tidal forces. So it appears that a Weyl curvature, which is described
as 1/2 of the Riemann curvature tensor[where it is split into two
parts, the Ricci tensor and the Weyl tensor] is dependent on
matter-energy -"existing" in the universe also?
Thanks for the help.
This seems to contradict Heisenberg uncertainty which says there can be no 100% vacuum, because uncertainty in position and uncertainty in momentum must be greater than zero:
DxDp >= [Planck's constant]/[2*pi]
Mach's principle seems to say that the distribution of matter-energy determines the geometry of space-time, and if there is no matter-energy then there is no geometry.
The Weyl tensor vanishes for a constant curvature if there are no
tidal forces. So it appears that a Weyl curvature, which is described
as 1/2 of the Riemann curvature tensor[where it is split into two
parts, the Ricci tensor and the Weyl tensor] is dependent on
matter-energy -"existing" in the universe also?
Thanks for the help.