Feebly compact paratopological groups and real-valued functions
![Thumbnail](/xmlui/bitstream/handle/10234/67300/56094.pdf.jpg?sequence=6&isAllowed=y)
Visualitza/
Metadades
Mostra el registre complet de l'elementcomunitat-uji-handle:10234/9
comunitat-uji-handle2:10234/7037
comunitat-uji-handle3:10234/8635
comunitat-uji-handle4:
INVESTIGACIONMetadades
Títol
Feebly compact paratopological groups and real-valued functionsData de publicació
2012Editor
Springer-VerlagISSN
1436-5081; 0026-9255Tipus de document
info:eu-repo/semantics/articleVersió de l'editorial
http://link.springer.com/content/pdf/10.1007%2Fs00605-012-0444-3.pdfVersió
info:eu-repo/semantics/sumittedVersionParaules clau / Matèries
Resum
We present several examples of feebly compact Hausdorff paratopological groups (i.e., groups with continuous multiplication) which provide answers to a number of questions posed in the literature. It turns out that a ... [+]
We present several examples of feebly compact Hausdorff paratopological groups (i.e., groups with continuous multiplication) which provide answers to a number of questions posed in the literature. It turns out that a 2-pseudocompact, feebly compact Hausdorff paratopological group G can fail to be a topological group. Our group G has the Baire property, is Fréchet–Urysohn, but it is not precompact. It is well known that every infinite pseudocompact topological group contains a countable non-closed subset. We construct an infinite feebly compact Hausdorff paratopological group G all countable subsets of which are closed. Another peculiarity of the group G is that it contains a nonempty open subsemigroup C such that C−1 is closed and discrete, i.e., the inversion in G is extremely discontinuous. We also prove that for every continuous real-valued function g on a feebly compact paratopological group G , one can find a continuous homomorphism φ of G onto a second countable Hausdorff topological group H and a continuous real-valued function h on H such that g=h∘φ . In particular, every feebly compact paratopological group is R3 -factorizable. This generalizes a theorem of Comfort and Ross established in 1966 for real-valued functions on pseudocompact topological groups. [-]
Publicat a
Monatshefte für Mathematik (2012) 168, 3-4Drets d'accés
Apareix a les col.leccions
- MAT_Articles [764]