SteveL27 said:
Are you arguing that
a) The Continuum hypothesis has a definite truth value in the physical world; which implies its truth value can be discovered by physical experiment; and
No; I find the the CH wholly irrelevant to physical concerns, and thus am free to make a choice which simplifies notation.
b) There are transfinite cardinalities of "spatial events" in the physical universe?
This is certainly the statement of our best physical theories, and I have no reason to go against them on this point.
And while it is surely true that only a finite amount of information extracted from their full complexity actually "matter", that just means it would be an interesting and possibly useful exercise to work out the properties of this information and come up with a 'background-free' description that does not make reference to the manifold of events.
e.g. I believe Einstein's hole argument shows the only relevant physical information about a collection of point particles that pass through a 'hole' in space-time consists of a finite graph with various labels on its edges and vertices.
But asserting that a continuum of events is actually
wrong is in direct conflict with the scientific evidence we have to date.
Do you believe that there are analogs of all the transfinite cardinals in the physical world? After all, we can just keep taking power sets of these aleph-1 objects that you've already posited.
I don't see the problem with there being \aleph_2-many regions of spacetime or \aleph_3-many classes of regions.
Do you think there are inaccessible cardinals?
Sure: 0 and \aleph_0, for example.
But more seriously, I think models of set theory with inaccessible cardinals have inaccessible cardinals, and those without, don't.
And that this question is the proper study of physicists?
If the presence of an inaccessible cardinal in the mathematical theory had observable consequences, then
of course it's a question in the proper study of physicists. I'm not aware of any consequences, though.
Do you think the Axiom of Choice is true in the physical universe? If it is, then you must accept Banach-Tarski. If not, physics has to throw out a lot of theorems of modern math.
I think the axiom of choice is true in our successful physical theories of the universe. I'm not sure what else your question would mean. And of course I accept Banach-Tarski -- it would be rather silly to think that measuring non-measurable sets would make sense. Honestly, I think it's more surprising that you can't do the same thing in one dimension.
(Aside: I've recently encountered the theorem that if you believe all sets are measurable in ZF, then it follows that you can partition the real line into more parts than it has points)
I hope I'm expressing why I think claiming that Zeno is solved in the physical world is a very difficult claim to support. That claim implies that the real numbers are physical things.
And the reals bring all the baggage of set theory.
No they don't. The reals are a tiny fragment of 'all the baggage of set theory' -- their first-order theory isn't even complicated enough for Gödel's incompleteness theorem to apply. Similarly, the math actually used in our physical theories -- or even by most mathematicians -- is only a small fragment of the whole of ZFC.
