Autor: Szeptycki, Paul - Katalog OPAC zbiorów

Skocz do pozycji: 1.

Tytuł:: Countably metacompact spaces in the constructible universe
Autorzy:: Szeptycki, Paul
Powiązania:: https://bibliotekanauki.pl/articles/1208568.pdf
Data publikacji:: 1993
Wydawca:: Polska Akademia Nauk. Instytut Matematyczny PAN
Tematy:: countably metacompact
$G_δ$, ♢*
Opis:: We present a construction from ♢* of a first countable, regular, countably metacompact space with a closed discrete subspace that is not a $G_δ$. In addition some nonperfect spaces with σ-disjoint bases are constructed.
Źródło:: Fundamenta Mathematicae; 1993, 143, 3; 221-230
0016-2736
Pojawia się w:: Fundamenta Mathematicae
Dostawca treści:: Biblioteka Nauki

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Skocz do pozycji: 2.

Tytuł:: Almost disjoint families and property (a)
Autorzy:: Szeptycki, Paul
Vaughan, Jerry
Powiązania:: https://bibliotekanauki.pl/articles/1205285.pdf
Data publikacji:: 1998
Wydawca:: Polska Akademia Nauk. Instytut Matematyczny PAN
Tematy:: property (a), density
extent
almost disjoint families
Ψ-space
CH
GCH
Martin's Axiom
$\got p = \got c$
Cohen forcing
Q-set
weakly inaccessible cardinal.
Opis:: We consider the question: when does a Ψ-space satisfy property (a)? We show that if $|A| < \got p$ then the Ψ-space Ψ(A) satisfies property (a), but in some Cohen models the negation of CH holds and every uncountable Ψ-space fails to satisfy property (a). We also show that in a model of Fleissner and Miller there exists a Ψ-space of cardinality $\got p$ which has property (a). We extend a theorem of Matveev relating the existence of certain closed discrete subsets with the failure of property (a).
Źródło:: Fundamenta Mathematicae; 1998, 158, 3; 229-240
0016-2736
Pojawia się w:: Fundamenta Mathematicae
Dostawca treści:: Biblioteka Nauki

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Skocz do pozycji: 3.

Tytuł:: $G_δ$-sets in topological spaces and games
Autorzy:: Winfried, Just
Sheepers, Marion
Steprans, Juris
Szeptycki, Paul
Powiązania:: https://bibliotekanauki.pl/articles/1205436.pdf
Data publikacji:: 1997
Wydawca:: Polska Akademia Nauk. Instytut Matematyczny PAN
Tematy:: game
strategy
Lusin set, Sierpiński set, Rothberger's property C"
concentrated set
λ-set, σ-set
perfectly meager set, Q-set
$s_0$-set
$A_1$-set
$A_2$-set
$A_3$-set
${\ninegot b}$
${\ninegot d}$
Opis:: Players ONE and TWO play the following game: In the nth inning ONE chooses a set $O_n$ from a prescribed family ℱ of subsets of a space X; TWO responds by choosing an open subset $T_n$ of X. The players must obey the rule that $O_n ⊆ O_{n+1} ⊆ T_{n+1} ⊆ T_n$ for each n. TWO wins if the intersection of TWO's sets is equal to the union of ONE's sets. If ONE has no winning strategy, then each element of ℱ is a $G_δ$-set. To what extent is the converse true? We show that:
(A) For ℱ the collection of countable subsets of X:
  1. There are subsets of the real line for which neither player has a winning strategy in this game.
  2. The statement "If X is a set of real numbers, then ONE does not have a winning strategy if, and only if, every countable subset of X is a $G_δ$-set" is independent of the axioms of classical mathematics.
  3. There are spaces whose countable subsets are $G_δ$-sets, and yet ONE has a winning strategy in this game.
  4. For a hereditarily Lindelöf space X, TWO has a winning strategy if, and only if, X is countable.
(B) For ℱ the collection of $G_σ$-subsets of a subset X of the real line the determinacy of this game is independent of ZFC.
Źródło:: Fundamenta Mathematicae; 1997, 153, 1; 41-58
0016-2736
Pojawia się w:: Fundamenta Mathematicae
Dostawca treści:: Biblioteka Nauki

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