# A generalization of $\Lambda$-closed sets in ideal minimal spaces

### Abstract

The notions of $m^\star$-closed sets and $m$-$\cal I$$_g$-closed sets in an ideal minimal space are introduced and investigated by Ozbakir and Yildirim [16]. In this paper, we introduce the notion of $(\Lambda, m^\star)$-closed sets and obtain a decomposition of $m^\star$-closed sets by using $m$-$\cal I$$_g$-closed sets and $(\Lambda, m^\star)$-closed sets. As the consequence, we can obtain decompositions of $\star$-closed sets in ideal topological spaces and closed sets due to Arenas et al [1].

Published

2017-12-28

How to Cite

NOIRI, Takashi; POPA, Valeriu.
A generalization of $\Lambda$-closed sets in ideal minimal spaces.

**Eurasian Bulletin of Mathematics (ISSN: 2687-5632)**, [S.l.], p. 1-10, dec. 2017. ISSN 2687-5632. Available at: <http://www.ebmmath.com/index.php/EBM/article/view/4>. Date accessed: 26 jan. 2022.
Issue

Section

Articles