Research article

On weakly bounded well-filtered spaces

  • Received: 31 March 2022 Revised: 05 June 2022 Accepted: 12 June 2022 Published: 19 July 2022
  • MSC : 06B35, 06F30, 18B30, 54D35

  • In [16], using Rudin sets, Miao, Li and Zhao introduced a new concept of weakly well-filtered spaces—$ k $-bounded well-filtered spaces. Now, also using Rudin sets, we introduce another type of $ T_0 $ spaces—weakly bounded well-filtered spaces, which are strictly stronger than $ k $-bounded well-filtered spaces. Some basic properties of $ k $-bounded well-filtered spaces and weakly bounded well-filtered spaces are investigated and the relationships among some kinds of weakly sober spaces and weakly well-filtered spaces are posed. It is proved that the category $ {\bf KBWF} $ is not reflective in the category $ {\bf Top}_{0} $.

    Citation: Xiaoyuan Zhang, Meng Bao, Xinpeng Wen, Xiaoquan Xu. On weakly bounded well-filtered spaces[J]. AIMS Mathematics, 2022, 7(9): 17026-17044. doi: 10.3934/math.2022936

    Related Papers:

  • In [16], using Rudin sets, Miao, Li and Zhao introduced a new concept of weakly well-filtered spaces—$ k $-bounded well-filtered spaces. Now, also using Rudin sets, we introduce another type of $ T_0 $ spaces—weakly bounded well-filtered spaces, which are strictly stronger than $ k $-bounded well-filtered spaces. Some basic properties of $ k $-bounded well-filtered spaces and weakly bounded well-filtered spaces are investigated and the relationships among some kinds of weakly sober spaces and weakly well-filtered spaces are posed. It is proved that the category $ {\bf KBWF} $ is not reflective in the category $ {\bf Top}_{0} $.



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