Regularity and normality of (L,M)-fuzzy topological spaces using residual implication.

In this paper, the notions of regularity and normality of (L , M) -fuzzy topological spaces are introduced by using residual implication, where L and M are completely distributive De Morgan algebras. It is shown that (L , M) -fuzzy interior operator and (L , M) -fuzzy closure operator can be used to characterize regularity and normality. The relationships among separation axioms of an (L , M) -fuzzy topological space are discussed. Moreover, it is proved that the four separation axioms are equivalent to one another in an (L , M) -fuzzy metric space. [ABSTRACT FROM AUTHOR]