[PDF] Top 20 Strongly (1,2)( ĝ )* Closed Sets In Bitopological Space

... 1. a pre-open set [1] if A  int(cl(A)) 2. a pre-closed set [1] if cl(int(A))  A 3. a semi-open set [2] if A  cl(int(A)) 4. a semi-closed set [2] if int(cl(A))  ... See full document

... - closed sets in bitopological spaces and after that several authors turned their attention towards generalizations of various concepts of topology by considering bitopological ...of ... See full document

... topological space X is called locally closed in X if it is the intersection of an open set and a closed set in ...τ 1 , τ 2 ) to be a set X ... See full document

... of Bitopological Spaces was initiated by Kelly [7] in 1963 ...a bitopological space and denoted it by (𝑋𝑋, 𝜏𝜏 1 , 𝜏𝜏 2 ) where (𝑋𝑋, 𝜏𝜏 1 ) and (𝑋𝑋, 𝜏𝜏 2 ) are the ... See full document

... generalized closed sets in the topological space was introduced by Levine [6] in ...gα-closed sets and sg-closed ...of bitopological spaces in 1963. Basavaraj, M.Ittangi ... See full document

... open sets in 1963 and also Levine [12] introduced generalized closed sets in ...β-open sets. Veerakumar[15] introduced # g-closed sets in topological ...of bitopological ... See full document

... {φ, {a, b, d}, X} Then (1,2)*-RGα O (X) ={X, φ, {a}, {b}, {c}, {d}, {a, b}, {c, d}, {a, b, c}, {a, b, d}}. The set {a, c} is (1,2)*- rgα-nbhd of the point c, since the(1,2)*- rgα-open sets {c} is such that c ∈ {c} ... See full document

... A triple (X, , ) where X is a non empty set and and are topologies on X is called a bitopological space. For a subset A of (X, , ), the closure of A and the interior of A with respect to is denoted by i - ... See full document

... of sets called (1, 2) * - πgb-closed sets and a new class of generalized functions called (1, 2) * -πgb- continuous maps and (1, 2) * -πgb- irresolute maps ... See full document

... open sets in bitopological ...semi closed sets in nano topological space ...of sets on nano bitotpological spaces called nano (1,2)* generalized semi closed sets ... See full document

... of Bitopological Spaces was introduced by Kelly [16] in ...𝜏𝜏 1 and 𝜏𝜏 2 is called Bitoplogical spaces and it is denoted by (𝑋𝑋, 𝜏𝜏 1 , 𝜏𝜏 2 ) ...of closed sets defined in ... See full document

... a bitopological space and Kelly [5] has initiated the study of such ...- closed sets in bitopological ...considering bitopological spaces was done by several ...generalized ... See full document

... of sets called (1,2)⃰ -π generalized b ⃰-closed set (briefly (1,2) ⃰ - πgb ⃰ -closed) in bitopological spaces and a new class of generalized functions called (1,2) ⃰ -πgb ⃰ -continuous maps ... See full document

... locally closed sets in [4] to define LC-continuity and ...closed sets. Veera Kumar [16] (Sheik John [14]) introduced ˆ g-locally closed sets (= ω-locally closed ... See full document

... of closed sets. For instance, a certain form of generalized closed sets was initiated by Levine ...generalized closed set, the definition being formulated in terms of ...between ... See full document

... g*s-closed sets is {ϕ, X,{b},{c},{b, ...a closed map. Since the closed set {b,c} in (X, ),f({b,c})={b,c} is not closed set in ... See full document

... of bitopological spaces was introduced by Kelly [4] in ...in bitopological spaces were first studied by ...generalized closed sets and pairwise generalized closure operator in ... See full document

... G cl(int(A))\A. Since X\G is b # -open and A X\G from the Definition 4.1, cl(int(A)) X\G. That is G X\(cl(int(A)) that implies G cl(int(A))∩(X\ (cl(int(A)))=. Conversely let A G where G is a b # -open sub set of X. If ... See full document

... (ii) Let V be any open set in Y. Since f is strongly bĝ–quotient map, (V) is bĝ–open in X. This means that f is bĝ–continuous. Now let (V) be any open set in X. Since from Proposition [7] remark 3.23, (V) is also ... See full document

... A point x of a Fine space (X, 𝜏, 𝜏 𝑓 ). is called a Fine semi generalized limit point (written as F-sg- limit point ) of a subset A of Fine space X , if for each F-sg-open set U containing x , A  (U-{x}) ... See full document