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Sequential continuity and submeasurable cardinals
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SYSNO ASEP 0174964 Document Type J - Journal Article R&D Document Type Journal Article Subsidiary J Ostatní články Title Sequential continuity and submeasurable cardinals Author(s) Balcar, Bohuslav (MU-W) RID, SAI
Hušek, M. (CZ)Source Title Topology and its Applications. - : Elsevier - ISSN 0166-8641
Roč. 111, 1-2 (2001), s. 49-58Number of pages 10 s. Language eng - English Country NL - Netherlands Subject RIV BA - General Mathematics R&D Projects GA201/97/0216 GA ČR - Czech Science Foundation (CSF) CEZ AV0Z1019905 - MU-W Annotation Submeasurable cardinals are defined in a similar way as measurable cardinals are. Their characterizations are given by means of sequentially continuous pseudonorms (or homomorphisms) on topological groups and of sequentially continuous ( or uniformly continuous) functions on Cantor spaces (for that purpose it is proved that if a complete Boolean algebra admits a nonconstant sequentially continuous function, it admits a Maharam submeasure). Workplace Mathematical Institute Contact Jarmila Štruncová, struncova@math.cas.cz, library@math.cas.cz, Tel.: 222 090 757 Year of Publishing 2002
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