Debunking a misconception in "Creation Science" [sic]
Hi, heliocentricprose,
heliocentricprose said:
I've read that the universe is 13.7 billion years old.
Also, I've read that time passes "slower" when an object is close to a large mass as opposed to an object close to a smaller mass.
Take two galaxies. One galaxy is half the mass of the other. At this moment, has 13.7 billion years passed for both galaxies? Is the heavier galaxy using up its supply of hydrogen slower than the lighter one?
Actually, for an observer "hovering" near a massive object, both the mass of the object and the "distance" to the object are relevant.
As you may know, the so-called "Young Earth theory" [sic], a topic in the so-called "Creation Science" [sic] movement, attempts to reconcile Ussher's age based upon scripture (see http://en.wikipedia.org/wiki/Bishop_Usher) , 6010 years plus a few months, with the age based upon science, about 4.5 billion years, which is a considerable discrepancy. One of the sillier arguments I have seen is the claim that gravitational time dilation explains this away!
Recall that "gravitational time dilation" is a potentially misleading shorthand for the fact that if an observer, A, located on surface of the Earth, emits time signals at the rate of one per second by his ideal clock, and if these signals are received by a second observer, B, located very far away from any massive objects, then B will find that the signals arrive at intervals longer than one second by his ideal clock.
To see what's wrong with the "Creation Science" claim, note that in the Schwarzschild vacuum (the simplest model in gtr which can be used in this situation), we have
\frac{dt}{ds} = \frac{1}{\sqrt{1-2 m/r}} \approx 1 + m/r
where m/r \approx 6.958 \times 10^{-10} for the Earth. This says that in our scenario, B will measure time signals from A to be running slow at a rate of less than one part per billion (in American terminology). So this certainly does not reconcile Bishop Ussher's alleged "scriptural age" with the scientific age!
(By the way, for a neutron star, the ratio m/r can be much larger, about 0.3.)
The analogous objection about mainstream cosmology is even easier to debunk: the textbook analysis of standard cosmological models such as the FRW models
does take account of all relativistic effects in computing the elapsed time measured by an ideal clock carried by an observer more comoving with an idealized galaxy (see for example D'Inverno, Introducing Einstein's Relativity for a very readable discussion of these models).
In your scenario, you need to be more specific about where in each galaxy your two observers are located. E.g. if they are both hovering outside stars, the "gravitational time dilation" (wrt distant observers) will probably be dominated by this massive nearby object, but will be tiny. The details would depend upon the m/r ratio as above.
