On some classes of nilpotent Leibniz algebras.
Ayupov, Sh.A., Omirov, B.A. (2001)
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Ayupov, Sh.A., Omirov, B.A. (2001)
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Greshnov, A.V. (2001)
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Kiguradze, I. (1994)
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Takashi Inaba, Paweł Walczak (1996)
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The Hausdorff dimension of the holonomy pseudogroup of a codimension-one foliation ℱ is shown to coincide with the Hausdorff dimension of the space of compact leaves (traced on a complete transversal) when ℱ is non-minimal, and to be equal to zero when ℱ is minimal with non-trivial leaf holonomy.
Romanov, V.G. (2002)
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Mazurov, V. D. (2003)
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Michael Levin, Yaki Sternfeld (1996)
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Let X be a compact metric space and let C(X) denote the space of subcontinua of X with the Hausdorff metric. It is proved that every two-dimensional continuum X contains, for every n ≥ 1, a one-dimensional subcontinuum with . This implies that X contains a compact one-dimensional subset T with dim C (T) = ∞.
Yushchenko, A. V. (2002)
Sibirskij Matematicheskij Zhurnal
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