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515.1 (45) |
Topologie (44) |
SM ISO690:2012 ARNAUTOV, Vladimir, ERMACOVA, Galina. On the number of ring topologies on countable rings. In: Buletinul Academiei de Ştiinţe a Republicii Moldova. Matematica, 2015, nr. 1(77), pp. 103-114. ISSN 1024-7696. |
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Buletinul Academiei de Ştiinţe a Republicii Moldova. Matematica | ||||||
Numărul 1(77) / 2015 / ISSN 1024-7696 /ISSNe 2587-4322 | ||||||
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CZU: 515.1 | ||||||
Pag. 103-114 | ||||||
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Rezumat | ||||||
For any countable ring R and any non-discrete metrizable ring topology
0, the lattice of all ring topologies admits:
– Continuum of non-discrete metrizable ring topologies stronger than the given topo-
logy 0 and such that sup{1, 2} is the discrete topology for any different topologies;
– Continuum of non-discrete metrizable ring topologies stronger than 0 and such that
any two of these topologies are comparable;
– Two to the power of continuum of ring topologies stronger than 0, each of them
being a coatom in the lattice of all ring topologies. |
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Cuvinte-cheie Countable ring, ring topology, number of ring topologies, Stone- ˇ Cech compacification., Hausdorff topology, basis of the filter of neighborhoods, lattice of ring topologies |
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