Add to ORKGSome fundamental properties of maximal open sets are obtained, such as decom-position theorem for a maximal open set. Basic properties of intersections of max-imal open sets are established, such as the law of radical closure. 2000 Mathematics Subject Classification: 54A05, 54D99. 1. Introduction.
Maximal completion (Klein and Hirokawa 2011) is an elegantly simple yet powerful variant of Knuth-Be...
We introduce the concepts of max-closedness and numéraires of convex subsets of L+0, the nonnegative...
We present a theorem on the existence of a maximal element for a correspondence which is upper hemi-...
Some fundamental properties of maximal open sets are obtained, such as decomposition theorem for a m...
(Communicated by A. Ebadian) In this paper, the notion of maximal m-open set is introduced and its p...
Abstract. In this paper, we introduce and explore fundamental properties of weak form of γ-semi-open...
In 2001 and 2003, Nakaok and Oda [3] and [4] introduced the notation of maximal open sets and minima...
Abstract. In this paper, we introduce and study the notions of θ-g-derived, θ-g-border, θ-g-frontier...
For a topological property R and a set X, the collection R(X) of all topologies on X with property R...
In set theory, a maximality principle is a principle that asserts some maximality property of the un...
In this paper, we introduce and study new types of sets called α-minimal open and α-maximal open set...
Summary. Let X be a topological space and let A be a subset of X. A is said to be anti-discrete prov...
AbstractComfort and Hager investigate the notion of a maximal realcompact space and ask about the re...
summary:We show a new theorem which is a sufficient condition for maximal resolvability of a topolog...
Some splitting lemma of topological nature provides fundamental information when dealing with dynami...
Maximal completion (Klein and Hirokawa 2011) is an elegantly simple yet powerful variant of Knuth-Be...
We introduce the concepts of max-closedness and numéraires of convex subsets of L+0, the nonnegative...
We present a theorem on the existence of a maximal element for a correspondence which is upper hemi-...
Some fundamental properties of maximal open sets are obtained, such as decomposition theorem for a m...
(Communicated by A. Ebadian) In this paper, the notion of maximal m-open set is introduced and its p...
Abstract. In this paper, we introduce and explore fundamental properties of weak form of γ-semi-open...
In 2001 and 2003, Nakaok and Oda [3] and [4] introduced the notation of maximal open sets and minima...
Abstract. In this paper, we introduce and study the notions of θ-g-derived, θ-g-border, θ-g-frontier...
For a topological property R and a set X, the collection R(X) of all topologies on X with property R...
In set theory, a maximality principle is a principle that asserts some maximality property of the un...
In this paper, we introduce and study new types of sets called α-minimal open and α-maximal open set...
Summary. Let X be a topological space and let A be a subset of X. A is said to be anti-discrete prov...
AbstractComfort and Hager investigate the notion of a maximal realcompact space and ask about the re...
summary:We show a new theorem which is a sufficient condition for maximal resolvability of a topolog...
Some splitting lemma of topological nature provides fundamental information when dealing with dynami...
Maximal completion (Klein and Hirokawa 2011) is an elegantly simple yet powerful variant of Knuth-Be...
We introduce the concepts of max-closedness and numéraires of convex subsets of L+0, the nonnegative...
We present a theorem on the existence of a maximal element for a correspondence which is upper hemi-...