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Hyperspaces of two-dimensional continua

100%
Levin M. B., Sternfeld Y.
Fundamenta Mathematicae
|
1996
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tom 150
|
nr 1
17-24
EN
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 $T_n$ with $dim C (T_n) ≥ n$. This implies that X contains a compact one-dimensional subset T with dim C (T) = ∞.
2
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Fans are not c-determined

100%
Illanes A.
Colloquium Mathematicum
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1999
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tom 81
|
nr 2
299-308
EN
A continuum is a compact connected metric space. For a continuum X, let C(X) denote the hyperspace of subcontinua of X. In this paper we construct two nonhomeomorphic fans (dendroids with only one ramification point) X and Y such that C(X) and C(Y) are homeomorphic. This answers a question by Sam B. Nadler, Jr.
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On some forms of quasi-uniform convergence of transfinite sequence of multifunctions

75%
Przemski M.
Commentationes Mathematicae
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2010
|
tom 50
|
nr 1
EN
In this paper we introduce various forms of convergence of transfinite sequences of multifunctions with values in a quasi-uniform space. We also study some weak types of continuity for such multifunctions. Any such sequence of multifunctions generates the sequence of the sets of weak types of continuity points and the sequence of various types of cluster sets of members of such sequence. We study the connection between convergence of a transfinite sequences of multifunctions and convergence of the corresponding sequences of the sets of the weak continuity points and the sequences of cluster sets. Some of the presented results concern of general nets of multifunctions.
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