In this paper we further investigate the results given in [7, 8, 9]. In Section 2 we consider space $X$ for which the closure of each countably compact (strongly countably compact, hypercountably compact) subspace of $X$ has countably compact (strongly countably compact, hypercountablycompact) property. In Section 3 we study some notions related to the classical concepts of being a Lindelöf, Menger or a Rothberger space.

@article{MM3_2000_4_1_a9,
     author = {Du\v{s}an Milovan\v{c}evi\'c},
     title = {Some {Properties} {Similar} to {Countable} {Compactness} and {Lindel\"of} {Property}},
     journal = {Mathematica Moravica},
     pages = {67 - 73},
     publisher = {mathdoc},
     volume = {4},
     number = {1},
     year = {2000},
     url = {https://geodesic-test.mathdoc.fr/item/MM3_2000_4_1_a9/}
}

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Dušan Milovančević. Some Properties Similar to Countable Compactness and Lindelöf Property. Mathematica Moravica, Tome 4 (2000) no. 1. https://geodesic-test.mathdoc.fr/item/MM3_2000_4_1_a9/