学术论文

      Alexandrov空间的公理体系

      Axiomatic systems of Alexandrov spaces

      摘要:
      为了研究Alexandrov空间的内部公理体系和序方面的特征,利用点集拓扑学和Locale理论中的已有结论,将各结构限制到Alexandrov空间的框架中,得到Alexandrov空间的等价刻画.研究结果表明Alexandrov空间在范畴意义下同构于Alexandrov邻域系统、Alexandrov闭包算子、Alexandrov内部算子、Alexandrov导算子等,T0的Alexandrov空间同构于偏序集、对偶等价于完全生成格.Alexandrov空间可以用邻域系统、闭包算子、内部算子、导算子,特殊化序和无点化序进行等价刻画.
      Abstract:
      In order to study internel axiomatic systems and ordered features of Alexandrov spaces, with the help of some existed results in topology and locale theory, by restricting the related structures into Alexandrov setting, some equivalent descriptions are obtained.The results show that Alexandrov spaces are categorically isomorphic to Alexandrov neighborhood systems, Alexandrov closure operators, Alexandrov interior operators and Alexandrov derived operators;T0 Alexandrov spaces are isomorphic to posets and dual to complete-generated lattices.Alexandrov spaces can be completely characterized by neighborhood systems, closure operators, interior operators, derived system, the specialization order and the point-free order.
      作者: 张山山 [1] 李扉 [2] 姚卫 [1]
      Author: ZHANG Shanshan [1] LI Fei [2] YAO Wei [1]
      作者单位: 河北科技大学理学院,河北石家庄,050018 北京林业大学理学院,北京,100081
      刊 名: 河北科技大学学报 ISTICPKU
      年,卷(期): 2017, 38(4)
      分类号: O189
      在线出版日期: 2017年8月14日
      基金项目: 国家自然科学基金,中央高校基本科研业务专项资金项目,河北省高等学校科学技术研究项目重点项目