LOCALLY COMPACT PERFECTLY NORMAL SPACES MAY ALL
... will surely find increasing use in set-theoretic topology since it produces strong “Suslin-type” [KuTa] consequences of MA + ∼CH, e.g. all Aronszajn trees are special, subspaces of countably tight compact spaces are hereditarily Lindelöf if and only if they are hereditarily separable, as well as − ...
... will surely find increasing use in set-theoretic topology since it produces strong “Suslin-type” [KuTa] consequences of MA + ∼CH, e.g. all Aronszajn trees are special, subspaces of countably tight compact spaces are hereditarily Lindelöf if and only if they are hereditarily separable, as well as − ...
![arXiv:math/0201251v1 [math.DS] 25 Jan 2002](http://s1.studyres.com/store/data/014913155_1-788f445ae3a0c155aa768d6df676e28b-300x300.png)
... has been established, the kind of topological don't determinant. The result in this paper algebraically satisfied, now we will satisfy it algebraically and topologically. This work divided into two sections. In section one includes some necessary definitions while section two includes propositions. ...
Topologies on the set of closed subsets
... topology on X can be described by a relationship of "infinitely close" on some points of *X (see [9], [13], [14]). If X is a topological space, x E X and y E *X we say y is infinitely close to JC, written y ~ JC o r y E μ ( x ) , provided for every standard open set 0 if x E € then y6*(?. In this ca ...
... topology on X can be described by a relationship of "infinitely close" on some points of *X (see [9], [13], [14]). If X is a topological space, x E X and y E *X we say y is infinitely close to JC, written y ~ JC o r y E μ ( x ) , provided for every standard open set 0 if x E € then y6*(?. In this ca ...
