Nano ∧β-sets and nano ∧β-continuity
Hosny, M. (2020). Nano ∧β-sets and nano ∧β-continuity. EKB Journal Management System, 28(1), 1-11. doi: 10.1186/s42787-020-0070-5
M. Hosny. "Nano ∧β-sets and nano ∧β-continuity". EKB Journal Management System, 28, 1, 2020, 1-11. doi: 10.1186/s42787-020-0070-5
Hosny, M. (2020). 'Nano ∧β-sets and nano ∧β-continuity', EKB Journal Management System, 28(1), pp. 1-11. doi: 10.1186/s42787-020-0070-5
Hosny, M. Nano ∧β-sets and nano ∧β-continuity. EKB Journal Management System, 2020; 28(1): 1-11. doi: 10.1186/s42787-020-0070-5

Nano ∧β-sets and nano ∧β-continuity

Journal of the Egyptian Mathematical Society
Volume 28, Issue 1, June 2020, Page 1-11  XML PDF (693.76 K)
DOI: 10.1186/s42787-020-0070-5
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Author
M. Hosny1, 2
1Department of Mathematics, College of Science for Girls, King Khalid University, Abha, Saudi Arabia
2Department of Mathematics, Faculty of Education, Ain Shams University, Cairo, Egyp
Abstract
The concept of nano near open sets was originally proposed by Thivagar and
Richard (Int. J. Math. Stat. Inven 1:31-37). The main aspect of this paper is to
introduce a new sort of nano near open sets namely, nano ∧β-sets. Fundamental
properties of these sets are studied and compared to the previous one. It turns out
that every nano β-open set is a nano ∧β-set. So, nano ∧β-sets are an extension of the
previous nano near open sets, such as nano regular open, nano α-open, nano semiopen, nano pre-open, nano γ-open, and nano β-open sets. Meanwhile, it is shown
that the concepts of nano ∧β-sets and nano δβ-open sets are different and
independent. Based on these new sets, nano ∧β-continuous functions are defined
and some results involving their characterizations are derived. In addition, the
concepts of nano ∨β-closure and nano ∧β-interior are presented. Their properties are
used to introduce and study the nano ∧β-continuous functions.

Keywords
Nano topology; Nano ∧β-sets; Nano ∧β-continuity
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