TY - JOUR
AU - Murad Arar,
TI - About Neutrosophic Countably Compactness
PY - 2020/10/08
Y2 - 2024/11/02
JF - Neutrosophic Sets and Systems
JA - Neutrosophic Sets Syst.
VL - 36
SE - SI#1,2024: Neutrosophical Advancements And Their Impact on Research
UR - https://fs.unm.edu/nss8/index.php/111/article/view/4032
SP - 246-255
AB - We answer the following question: Are neutrosophic µ-compactness and neutrosophic µ-countablycompactness equivalent? which posted in [10]. Since every neutrosophic topology is neutrosophic µ-topology,we answer the question for neutrosophic topological spaces, more precisely, we give an example of neutrosophictopology which is neutrosophic countably compact but not neutrosophic compact
ER -