On -images of metric spaces.
In this paper, we prove that a space is a sequentially-quotient -image of a metric space if and only if has a point-star -network consisting of -covers. By this result, we prove that a space is a sequentially-quotient -image of a separable metric space if and only if has a countable -network, if and only if is a sequentially-quotient compact image of a separable metric space; this answers a question raised by Shou Lin affirmatively. We also obtain some results on spaces with countable...
We show that a space is MCP (monotone countable paracompact) if and only if it has property , introduced by Teng, Xia and Lin. The relationship between MCP and stratifiability is highlighted by a similar characterization of stratifiability. Using this result, we prove that MCP is preserved by both countably biquotient closed and peripherally countably compact closed mappings, from which it follows that both strongly Fréchet spaces and q-space closed images of MCP spaces are MCP. Some results on...
Let be a sequence of covers of a space such that is a network at in for each . For each , let and be endowed the discrete topology. Put forms a network at some point and by choosing for each . In this paper, we prove that is a sequentially-quotient (resp. sequence-covering, compact-covering) mapping if and only if each is a -cover (resp. -cover, -cover) of . As a consequence of this result, we prove that is a sequentially-quotient, -mapping if and only if it is...
In this paper the relations of mappings and families of subsets are investigated in Ponomarev-systems, and the following results are obtained. (1) is a sequence-covering (resp. 1-sequence-covering) mapping iff is a csf -network (resp. snf -network) of for a Ponomarev-system ; (2) is a sequence-covering (resp. 1-sequence-covering) mapping iff every is a cs-cover (resp. wsn-cover) of for a Ponomarev-system . As applications of these results, some relations between sequence-covering mappings...
In this paper, we prove that a space is a -metrizable space if and only if is a weak-open, and -image of a semi-metric space, if and only if is a strong sequence-covering, quotient, and -image of a semi-metric space, where “semi-metric” can not be replaced by “metric”.
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