On Apr 6, 4:38 pm, Sylvia Else <syl...@not.at.this.address> wrote:
> Not being a subscriber, I can't read the paper.
I see that Bojowald has been quite prolific on the preprint server as
of late. You may get what you're looking for (and a lot more) by
accessing these articles, instead.
http://arxiv.org/abs/1302.5695 Quantum matter in quantum space-time
http://arxiv.org/abs/1212.5150 A loop quantum multiverse?
http://arxiv.org/abs/1212.4773 Deformed General Relativity
There's more besides this, but this gives you the general idea of
where he's coming from.
Everything's gone cliquish these days, and you have all these small,
easily-distinguishable niches running around. I notice that Kiefer is
an Author #2 on one of the preprint papers. So, this is probably one
of the "Kiefer people".
If you want an assessment of where LQG is these days, you need only
look at who's in this clique and (more significantly) who's left it.
As is also the case with string theory, the operative question is (and
always has been): "does it lead to deep changes in the foundations of
the field that enable one to successfully approach problems that are
currently "swept under the rug" and called "solved because we can't
see them anymore"? Or does it amplify the language, ideas, and
conventions of the previous century whose continued use has only led
to an impasse when dealing with the issue of developing a consistent,
unified foundation for the field?
Experimental checks are nice. But let's first get the house in order
and the ducks in a row before presuming to line them up for target
practice. As long as any field, methodology or formalism continues to
use (or even take for granted) the "regularization" or "infinite
renormalization"[1] step, it has not succeeded in explaining anything.
Both LQG and string theory take the infinite renormalization step as a
given. Therefore, they do not qualify for the label of "new
foundation", but only for label "20th century writ large".
Note:
[1] The emphasis is on "infinite" not "renormalization". Finite
renormalization is an entirely different matter, which has no bearing
on the issue at hand.