a-Irresoluteness and a-compactness based on continuous valued logicq
org/10.1016/j.joems.2012.08.010
Abstract
This paper considers fuzzifying topologies, a special case of I-fuzzy topologies (bifuzzy topologies), introduced by Ying [1]. It investigates topological notions defined by means of a-open sets when these are planted into the framework of Ying’s fuzzifying topological spaces (by Łukasiewicz logic in [0, 1]) . The concept of a-irresolute functions and a-compactness in the framework of fuzzifying topology are introduced and some of their properties are obtained. Weuse the finite intersection property to give a characterization of fuzzifying a-compact spaces. Furthermore, we study the image of fuzzifying a-compact spaces under fuzzifying a-continuity and fuzzifying a-irresolute maps.
(2012). a-Irresoluteness and a-compactness based on continuous valued logicq. Journal of the Egyptian Mathematical Society, 20(2), 116-125. doi: org/10.1016/j.joems.2012.08.010
MLA
. "a-Irresoluteness and a-compactness based on continuous valued logicq". Journal of the Egyptian Mathematical Society, 20, 2, 2012, 116-125. doi: org/10.1016/j.joems.2012.08.010
HARVARD
(2012). 'a-Irresoluteness and a-compactness based on continuous valued logicq', Journal of the Egyptian Mathematical Society, 20(2), pp. 116-125. doi: org/10.1016/j.joems.2012.08.010
VANCOUVER
a-Irresoluteness and a-compactness based on continuous valued logicq. Journal of the Egyptian Mathematical Society, 2012; 20(2): 116-125. doi: org/10.1016/j.joems.2012.08.010