The usual answer will be obviously, they have "infinite" measure, but what is their measure in higher dimension? Cannot we just say that if you make the manifold's $n$-volume too big, its dimension rises and they obtain $n+1$-volume, like fractals?
2026-03-25 20:20:29.1774470029
Do infinite manifolds have any Hausdorff measure, maybe of higher dimension?
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