| Article ID | Journal | Published Year | Pages | File Type |
|---|---|---|---|---|
| 4658676 | Topology and its Applications | 2014 | 11 Pages |
Whyburn [19] showed that for a T1T1-space Y, every quotient map onto Y is pseudo-open (= hereditarily quotient) if and only if Y is an accessibility space defined in [19]. Similar topics to Whyburnʼs result were studied in Siwiec [15], Michael, Olson and Siwiec [13], Lin and Zhu [10] and so on. In this paper, advancing the results in [10], we show that for a T1T1-space Y: (1) every quotient map onto Y is almost-open if and only if every quotient map onto Y is strictly countably bi-quotient if and only if Y is submaximal and extremally disconnected, and (2) every quotient map onto Y is bi-quotient if and only if Y is submaximal and has property NCA(ω)NCA(ω) defined in this paper. Similar topics on countable-covering maps are also studied.
