On m∗-g-closed sets and m∗-R0 spaces in a hereditary m-space (X, m,H)

On m∗-g-closed sets and m∗-R0 spaces in a hereditary m-space (X, m,H)

  • Ahu Açıkgöz
  • Takashi Noiri Yatsushiro-shi, Kumamoto-ken

Abstract

The minimal local function and the minimal structure m∗H which includes m in a hereditary
minimal space (X, m, H) have been described by Noiri and Popa [22]. Noiri and Popa [22] also have
introduced and investigated the notion of m − Hg−closed sets and (Λ, m∗ H)− closed sets in a hereditary
minimal space (X, m, H). We describe the notions of m∗ − g−closed sets and m∗ − Hg− closed sets in a
hereditary minimal space (X, m, H) and study at some of their fundamental features and characterizations
in this study.

Published
2021-09-14
How to Cite
AÇIKGÖZ, Ahu; NOIRI, Takashi. On m∗-g-closed sets and m∗-R0 spaces in a hereditary m-space (X, m,H). Eurasian Bulletin of Mathematics (ISSN: 2687-5632), [S.l.], v. 4, n. 2, p. 98-106, sep. 2021. ISSN 2687-5632. Available at: <http://www.ebmmath.com/index.php/EBM/article/view/81>. Date accessed: 27 nov. 2021.