Benjamin Crowell, you wrote in the book:
"
Because of these issues, Einstein decided to try to patch up his field equation so that it would allow a static universe. Looking back
over the considerations that led us to this form of the equation, we see that it is very nearly uniquely determined by the following
criteria:
1. It should be consistent with experimental evidence for local conservation of energy-momentum.
2. It should satisfy the equivalence principle.
3. It should be coordinate-independent.
4. It should be equivalent to Newtonian gravity or \plain" general
relativity in the appropriate limit.
5. It should not be overdetermined.
This is not meant to be a rigorous proof, just a general observation that it's not easy to tinker with the theory without breaking it.
A failed attempt at tinkering Example:
As an example of the lack of “wiggle room” in the structure of the field equations, suppose we construct the scalar Tcc
a , the trace of
the stress-energy tensor, and try to insert it into the field equations as a further source term. The first problem is that the field
equation involves rank-2 tensors, so we can’t just add a scalar. To get around this, suppose we multiply by the metric. We then
have something like Gab = c1Tab + c2gabTcc , where the two constants c1 and c2 would be constrained by the requirement that the theory agree with Newtonian gravity in the classical limit.
To see why this attempt fails, note that the stress-energy tensor of an electromagnetic field is traceless, Tc c = 0. Therefore the beam of light’s coupling to gravity in the c2 term is zero. As discussed onpp. 273-276, empirical tests of conservation of momentum would therefore constrain c2 to be . 10-8.
One way in which we can change the eld equation without violating any of these requirements is to add a term g_ab, giving
"
What can be still, more simple explained: maybe in Minkowski spacetime limit this part should be proportional to (-1, 1, 1, 1) because of equivalence principle (EP), beside other? Is this the most visualized aspect? Why otherwise, EP is not valid? The most key property of vacuum energy is that density analogy is negative, where pressure analogies are expectedly positive. Why EP causes that "density" of vacuum energy in negative?
You give first and important information about this, Baez, Bunn, and Carroll did not explain this problem in their one paper, and one book, but can you a little more visualize?
