The following is probably just an ELI5 version of Dacyn's :
Just because you use a word (such as "set"), it doesn't mean that it has an unambiguous meaning.
Imagine the same discussion about "numbers". Can you subtract 5 from 3? In the universe of natural numbers, the answer is no. In the universe of all integers, the answer is yes. Is there a number such that if you multiply it by itself, the result is 2? In the universe of rational numbers, the answer is no; in the universe of real numbers, the answer is yes.
Here you probably don't see any problem. Some statements can be true about real numbers and false about rational numbers, because those are two different things. A person who talks about "numbers" in general, needs to be more specific. As we see here, defining addition, subtraction, multiplication, and division is still not enough to allow us to figure out the answer to "∃a: a × a = 2".
It's similar with the sets. The ZF(C) axioms are simply not enough to pinpoint what you actually mean by a "set". They reduce the space of possible meanings, sufficiently to let us prove many interesting things, but there are still (infinitely) many possible meanings compatible with all of the axioms. For some of those meanings, CH is true, for other meanings, CH is false.
Is there a "set" greater than ℵ0 but smaller than 2ℵ0? It depends.
Is there a "number" that is greater than 2 but smaller than 3? It depends.
What makes certain axioms "true" beyond mere consistency?
Nothing. What do you mean by "true" here? Matching our physical universe? That in general is not what math does. The natural numbers may already include some that exceed the number of particles in our universe. The real numbers are inspired by measuring actual things, but do we really need an infinite number of decimal places? On top of all that, sets are merely mental constructs. A set of {2, 8, 33897798} does not imply anything about our world.
Is there a meaningful distinction between mathematical existence and consistency?
No.
Can we maintain mathematical realism while acknowledging the practical utility of the multiverse approach?
Maybe I am missing some important aspect, but the "multiverse" seems to me just like a intuitively helpful metaphor, but the actual problem is more like this: is the natural number "2" the same object as the integer "2", the real number "2.0", the Gaussian integer "2+0i", the complex number "2.0+0.0i", etc.?
One possible approach is to say: those are different domains of discourse... uhm, let's call them parallel universes to make it intuitive for the sci-fi fans. The object in a parallel universe is a different object, but also in some sense the captain Picard from the parallel universe is a natural counterpart to our captain Picard. They are generally the same unless specified otherwise for the plot relevant reasons, just like "2.0" from the real number universe is the natural counterpart to "2" from the integer universe, except that the former can be divided by three and the latter cannot. (Some things do not have a counterpart in the other universe, etc.) This feels like a natural approach for real vs complex numbers, and probably like an overkill for natural numbers vs integers.
The assumption of different universes kinda goes against the Occam's razor; we could simply move all these objects into the same universe (different planets perhaps) and make a story about a spaceship captain from Earth and a spaceship captain from Mars. Now we don't have the concept of a natural counterpart, and the analogies need to make explicitly: the horses on Earth correspond to the giant six-legged lizards on Mars. There is a set of natural numbers, the set of real numbers, and a function N -> R which maps the object "2" to the object "2.0". More importantly, there is no such thing as "addition"; there are actually two different things, "natural number addition" and "real number addition", and we call the latter the extension of the former, if for each pair of natural numbers, the counterpart of their sum is the same as the sum of their counterparts. The question whether "2" and "2.0" are intrinsically the same object can become kinda meaningless, if we always talk about numbers qua members of one or the other set. They could be the same object, or they could be different objects; the important thing is what they do, i.e. how they participate in various functions and relations.
(This kinda reminds me of Korzybski's "Aristotelian" vs "Non-Aristotelian" thinking, where the former is about what things are, while the latter is about how things are related to each other. Is "2" the same as "2.0"? A meaningless question, from the non-A perspective. The important thing is what they do; how are they related to other numbers. The important facts about "2" are that "1+1=2" and "2+2=4" etc. We can show that we can map N to R in a way that preserves all existing addition and multiplication, and whenever we do so, "2.0" is the image of "2". And that's all there is.)
With sets, I guess it is similar. If we have different definitions of what a "set" means, is the empty set according to definition X the same mathematical object as the empty set according to definition Y? The question is meaningless, from the non-A perspective; but to avoid all the complicated philosophy, it is easier to say that one lives in the universe X, and the other lives in the universe Y, so they are "kinda the same, but not the same". But to be precise, there is no such thing as an "empty set", only something that plays the role of an empty set in a certain system. Some systems could not even have such role, or they could have multiple distinct empty sets -- for example, we could imagine a system where each set has a type, and the "empty set of integers" is different from the "empty set of reals", because it has a different content type.
(Now I suspect I have opened a new can of worms, like how to reconcile Platonism with Korzybski's non-A thinking, and... that would be a long debate that I would prefer to avoid. My quick opinion is that perhaps we should aim for some kind of "Platonism of function" rather than "Platonism of essence", i.e. what the abstract objects do rather than what they are. The question is whether we should still call this approach "Platonism", perhaps some other name would be better.)
I assume you're familiar with the case of the parallel postulate in classical geometry as being independent of other axioms? Where that independence corresponds with the existence of spherical/hyperbolic geometries (i.e. actual models in which the axiom is false) versus normal flat Euclidean geometry (i.e. actual models in which it is true).
To me, this is a clear example of there being no such thing as an "objective" truth about the the validity of the parallel postulate - you are entirely free to assume either it or incompatible alternatives. You end up with equally valid theories, it's just those theories are applicable to different models, and those models are each useful in different situations, so the only thing it comes down to is which models you happen to be wanting to use or explore or prove things about on a given day.
Similarly for the huge variety of different algebraic or topological structures (groups, ordered fields, manifolds, etc) - it is extremely common to have statements that are independent of the axioms, e.g. in a ring it is independent of the axioms whether multiplication is commutative or not. And both choices are valid. We have commutative rings, and we have noncommutative rings, and both are self-consistent mathematical structures that one might wish to study.
Loosely analogous to how one can write a compiler/interpreter for a programming language within other programming languages, some theories can easily simulate other theories. Set theories are particularly good and convenient for simulating other theories, but one can also simulate set theories within other seemingly more "primitive" theories (e.g. simulating it in theories of basic arithmetic via Godel numbering). This might be analogous to e.g. someone writing a C compiler in Brainfuck. Just like how it's meaningless to talk about whether a programming language or a given sub-version or feature extension of a programming language is more "objectively true" than another, there are many who take the position that the same holds for different set theories.
When you say you're "leaning towards a view that maintains objective mathematical truth" with respect to certain axioms, is there some fundamental principle by which you're discriminating the axioms that you want to assign objective truth from axioms like the parallel postulate or the commutativity of rings, which obviously have no objective truth? Or do you think that even in these latter cases there is still an objective truth?
This is true, but there's an important caveat: Mathematicians accepted Euclidean geometry long before they accepted non-Euclidean geometry, because they took it to be intuitively evident that a model of Euclid's axioms existed, whereas the existence of mod... (read more)