Singh, Sumit2022-10-062022-10-062022-10-031576-9402https://riunet.upv.es/handle/10251/187128[EN] A space X is said to be set star-Lindelöf if for each nonempty subset A of X and each collection U of open sets in X such that A ⊆ SU, there is a countable subset V of U such that A ⊆ St(SV, U). The class of set star-Lindelöf spaces lie between the class of Lindel¨of spaces and the class of star-Lindelöf spaces. In this paper, we investigate the relationship between set star-Lindelöf spaces and other related spaces by providing some suitable examples and study the topological properties of set starLindelöf spaces.Reconocimiento - No comercial - Sin obra derivada (by-nc-nd)MengerCoveringStar-CoveringStar-LindelöfStrongly star-LindelöfSet star-LindelöfTopological spaceOn set star-Lindelöf spacesArtículo10.4995/agt.2022.17021Abierto1989-4147