journal6 ›› 2001, Vol. 22 ›› Issue (4): 83-85.
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摘要:利用 q - 开集定义了 Qi( #em/em# = 0, 1, 2, 3, 4) 空间, 讨论了它们的性质及 Qi 空间同 Ti( i = 0, 1, 2, 3, 4) 空间的关系.给出了, q- 覆盖的定义,即拓扑空间 X 的q- 开集簇{Aα | α∈I } 称为 q- 覆盖, 当且仅当∪α∈IAα = X .继而定义了一种新的紧致空间——Q- 紧致空间, 讨论它的性质及 Q - 紧空间同 Qi 空间的关系, 得到一些性质.
关键词: q - 覆盖, Q - 紧致空间, Qi( i = 0, 1, 2, 3, 4) 空间
Abstract: Using q- open sets, the auther gives the definition to Qi ( #em/em#= 0, 1, 2, 3, 4) spaces and discuss their characters, and their relationship wi th Ti ( #em/em#= 0, 1, 2, 3, 4) spaces. Topological space X to q- open sets Mani fold { Aα|α∈I } is called q- cover,when only ∪α∈IAα = X . The auther also defines a new compact space: Q- compact space, and discusses the characters of Q- compact space and the relations between Q- compact space and Qi- space thus several conclusions are drawn.
Key words: q- cover, Q- compact space, Qi ( i= 0, 1, 2, 3, 4) space
苏发慧. q - 覆盖及其空间[J]. journal6, 2001, 22(4): 83-85.
SU Fa-Hui. Q- Covers and Related Spaces[J]. journal6, 2001, 22(4): 83-85.
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https://zkxb.jsu.edu.cn/CN/Y2001/V22/I4/83
