Does anyone know of a proof that the binary non-normals are uncountable in $[0,1]$ if that's even true? I am specifically referring to non simply normals, i.e numbers in which the asymptotic density of the digits $1$ and $0$ is not $\frac{1}{2}$.
2026-02-23 22:49:27.1771886967
Proof that the non simply normal numbers in base 2 are uncountable?
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