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Erdős space is the “rational” Hilbert space, that is, the set of vectors in ℓ² with all coordinates rational. Erdős proved that is one-dimensional and homeomorphic to its own square × , which makes it an important example in dimension theory. Dijkstra and van Mill found topological characterizations of . Let $M{ₙ}^{n+1}$, n ∈ ℕ, be the n-dimensional Menger continuum in ${ℝ}^{n+1}$, also known as the n-dimensional Sierpiński carpet, and let D be a countable dense subset of $M{ₙ}^{n+1}$. We consider the topological group $(M{ₙ}^{n+1},D)$ of all...