> Let the starting real be A. Suppose there is a next real; let it be B (generate it using some random process, if that floats your boat). The interval between them, B-A, let us call that C. I can divide C by 2, and produce a new real D=A+(C/2), which is smaller than B and larger than A. Therefore B is not the next real.
You need to decide whether you want to define counting as “there being a next element”, or “being able to produce those elements in a finite way with a predefined order”.
The issue here is that you are trying to make a finite/determinate assertion about an infinite process.
There are no reals in between 0.001 and 0.002, unless you generate them. And when you do, you can count them one by one until you finish generating them.
Just like you could never finish counting infinite real numbers, you could never finish counting infinite natural numbers.
So then what Cantors proof is saying is that if you could somehow count to infinity and get to a result, some infinities would have more elements than others. But that is a contradiction, because you can’t finish counting to infinity.
Hence, you cannot know infinity nor its cardinality. Not for the real numbers and not for the natural numbers either.
> There are no reals in between 0.001 and 0.002, unless you generate them.
You seem to be thinking of a real as a string of digits, or a block of bits, which is just the representation of a real. Like, a number doesn't exist until you think of it. That view doesn't help much in thinking about these matters.
> So then what Cantors proof is saying is that if you could somehow count to infinity and get to a result, some infinities would have more elements than others. But that is a contradiction, because you can’t finish counting to infinity.
So you're saying Cantor's "proof" embodies a contradiction. You must be a very great mathematician. I'm not a mathematician, so I'd better just bow out now. Anyway, I'm way too old to start thinking of numbers as some kind of generative process.
Why would someone need to be a mathematician to think and understand?
That’s just gate keeping through labels. And probably the reason why so many old ideas go completely unchecked and are taken as gospel for so long with no one questioning them.
You can clearly reason about this stuff, even if you are not a mathematician. But maybe it scares you to think that something that you thought was “true”, is just someone else’s opinion about what they thought it was true.
Unfortunately, a lot of results (proofs) about infinities are counter-intuitive, and they can't be disproven simply by showing how they go against (your) intuition. A proof is not "someone else's opinion"; it is formal reasoning that stands on its own, apart from whatever opinion may have been held by the creator of the proof.
In fact many proofs went against the opinion of the proof's creator.
So, I'm not "scared"; I'm prefectly prepared to take a stand against unproven orthodoxies. But I have enough humility to realize that if I think I've found a contradiction in a proof by a great mathematician such as Cantor, and nobody else has found it, then it must be me that's wrong.
You need to decide whether you want to define counting as “there being a next element”, or “being able to produce those elements in a finite way with a predefined order”.
The issue here is that you are trying to make a finite/determinate assertion about an infinite process.
There are no reals in between 0.001 and 0.002, unless you generate them. And when you do, you can count them one by one until you finish generating them.
Just like you could never finish counting infinite real numbers, you could never finish counting infinite natural numbers.
So then what Cantors proof is saying is that if you could somehow count to infinity and get to a result, some infinities would have more elements than others. But that is a contradiction, because you can’t finish counting to infinity.
Hence, you cannot know infinity nor its cardinality. Not for the real numbers and not for the natural numbers either.