Does weak countable choice imply that the Cauchy reals are Dedekind complete?

Question

Assuming the axiom of weak countable choice, is the set of modulated Cauchy reals Dedekind complete?

The second theorem on this ncatlab page claims something equivalent, but it doesn't contain a proof and I can't find any references for the claim outside of ncatlab.

Theorems. (assuming WCC ).

Every classical Cauchy real number is modulated, and any two equal Cauchy real numbers are equal as modulated Cauchy real numbers.

Every multivalued Cauchy real number is equal (as a multivalued Cauchy real number) to some classical Cauchy real number, and two classical Cauchy real numbers are equal if they are equal as multivalued Cauchy real numbers.

I know that both WCC and the Dedekind completeness of the Cauchy reals follow from $\text{CC} \lor \text{LEM}$, but I am unable to verify any implication between them.

Trying to prove it myself, the line of thought I keep pursuing is that since every irrational Dedekind real has a modulated Cauchy sequence, perhaps you only need to make a choice when the Dedekind real is near a rational number. The problem is that no matter how precise you get, you never know for sure when the time to make the choice is. With CC making the choice prematurely is fine, but with WCC you can only make one choice, so you can't "waste it".

Answer 1

I don't have a definitive answer, but since I wrote the text on nLab that sparked the question, I do have some things to say. Short version: This (probably) doesn't follow from WCC (and so I will edit the nLab page); instead, it follows from a different classically trivial form of countable choice.

There's a fair amount of material on WCC on Fred Richman's page at Flordia Atlantic, which seems to have disappeared last year, but is saved on the Internet Archive. If the result is true, then I probably got it from something there, although some of that was unpublished (and so not peer-reviewed, much like the nLab itself). Since Richman didn't cite it in his other paper, perhaps he realized that it was a mistake, or decided that WCC isn't that important after all, or else he only proved it after that paper.

More likely, the mistake was mine. One interesting thing about WCC is that it follows separately from Excluded Middle (without choice) and from Countable Choice (constructively). There is a different weak choice principle that has these two properties, and which does prove that every Dedekind real is a modulated Cauchy real: countable choice for subsets of $ \{ 0 , 1 \} $. That is, every $ \mathbb N $-indexed family of inhabited subsets of $ \{ 0 , 1 \} $ has a choice function; this follows from Countable Choice by fiat, and from Excluded Middle by picking $ 0 $ if it's available and $ 1 $ otherwise. (This is equivalent to the principle $ AC _ { weak } $ at another MO question.)

I believe that this explains the nLab page. But this doesn't actually answer the question as to whether WCC might imply the Dedekind completeness of the modulated Cauchy reals by some other trick.