This question comes up just from curiosity.
Let $B$ a Banach space and $A\subset B$ a topological subspace such that all the points of $A$ are isolated. Then, it is necessarily $A$ countable?
I assume that the answer is yes but I dont know how to do it (I tried build some proofs based in the radius of open balls but I failed). Some proof (or link to a proof) or counterexample will be appreciated, thank you.
No, they are not. In $l^\infty$, the set of bounded sequences, with the standard topology, the set of sequences that just contain 0 and 1 is uncountable; and they are isolated.