On δ-I-open sets and decomposition of α-I-continuity

“…δ-set and δ-I-set are independent concepts [1, Remark 2.2]. The following Theorem 2.1 shows that every δ-set is a δ-I-set, if the ideal is codense and Example 2.3 of [1] says that the reverse inclusion is not true, even if the ideal is codense. Theorem 2.2 below shows that for completely codense ideals, δ-I-sets coincide with δ-sets and so Proposition 2.6 of [1] becomes a corollary to Theorem 2.2.…”

“…In [1,Proposition 2.4], it is established that if A is a δ-I-set in an ideal space (X, τ, I), then A = B ∪ C, where B ∈ αIO(X), int cl (C) = ∅ and B ∩ C = ∅. The following theorem gives a necessary condition for a set to be a δ-I-set.…”

A note on δ-I-sets

“…δ-set and δ-I-set are independent concepts [1, Remark 2.2]. The following Theorem 2.1 shows that every δ-set is a δ-I-set, if the ideal is codense and Example 2.3 of [1] says that the reverse inclusion is not true, even if the ideal is codense. Theorem 2.2 below shows that for completely codense ideals, δ-I-sets coincide with δ-sets and so Proposition 2.6 of [1] becomes a corollary to Theorem 2.2.…”

“…In [1,Proposition 2.4], it is established that if A is a δ-I-set in an ideal space (X, τ, I), then A = B ∪ C, where B ∈ αIO(X), int cl (C) = ∅ and B ∩ C = ∅. The following theorem gives a necessary condition for a set to be a δ-I-set.…”

A note on δ-I-sets

“…After M. E. Abd El-Monsef introduced the concept of I-open set, many researchers were devoted to research on local semitopology. There are many local semiopen sets, such as β-I-open set, strong β-I-open set, and δ-I-open set [3][4][5]. All of these local semiopen sets are given by comparing interior and closure operators in the initial topology and its ideal derived topology.…”

Onα-Layer Ideal Topologies

“…Quite recently, Acikgoz and Yuksel [3] have introduced I -R closed sets and obtained a decomposition of continuity. Acikgoz et al [1], [2] investigated some properties of I -open sets and obtained decompositions of I -continuity and semi -I -continuity.…”

Decompositions of Some Forms of Continuity