Virtually nilpotent groups are coarse median if and only if virtually abelian, via sub-Riemannian obstruction in the asymptotic cone, completing a lattice classification.
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3 Pith papers cite this work. Polarity classification is still indexing.
3
Pith papers citing it
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2026 3verdicts
UNVERDICTED 3representative citing papers
Proves quasi-isometric rigidity for random subsets D of the product X of two regular trees into X, with independent samples a.s. non-quasi-isometric.
Cartesian products of the Sierpiński carpet (and similar self-similar fractals) with itself at least twice do not attain their conformal dimension.
citing papers explorer
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Coarse median property of virtually nilpotent groups
Virtually nilpotent groups are coarse median if and only if virtually abelian, via sub-Riemannian obstruction in the asymptotic cone, completing a lattice classification.
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Quasi-isometric rigidity for random subsets in products of trees
Proves quasi-isometric rigidity for random subsets D of the product X of two regular trees into X, with independent samples a.s. non-quasi-isometric.
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Cartesian products of Sierpi\'nski carpets do not attain their conformal dimension
Cartesian products of the Sierpiński carpet (and similar self-similar fractals) with itself at least twice do not attain their conformal dimension.