The Lindelöf number greater than continuum is u-invariant
| Data(s) |
24/07/2016
24/07/2016
2011
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|---|---|
| Resumo |
2000 Mathematics Subject Classification: 54C35, 54D20, 54C60. Two Tychonoff spaces X and Y are said to be l-equivalent (u-equivalent) if Cp(X) and Cp(Y) are linearly (uniformly) homeomorphic. N. V. Velichko proved that countable Lindelöf number is preserved by the relation of l-equivalence. A. Bouziad strengthened this result and proved that any Lindelöf number is preserved by the relation of l-equivalence. In this paper it has been proved that the Lindelöf number greater than continuum is preserved by the relation of u-equivalence. |
| Identificador |
Serdica Mathematical Journal, Vol. 37, No 2, (2011), 143p-162p 1310-6600 |
| Idioma(s) |
en |
| Publicador |
Institute of Mathematics and Informatics Bulgarian Academy of Sciences |
| Palavras-Chave | #Function Spaces #u-equivalence #u-invariant #Lindelöf Number #Set-Valued Mappings |
| Tipo |
Article |
