• GENERALIZED MINIMAL CONTINUOUS MAPS IN TOPOLOGICAL SPACES
Abstract
In this paper a new class of generalized minimal continuous maps in topological spaces are introduced and their related theorems have been proved. A mapping ¦: (X, t) ® (Y,s) is said to be generalized minimal continuous (briefly g- mi continuous) map if the inverse image of every minimal closed set in Y is a g- mi closed set in X. Also, as an analogy of gc- irresolute maps, generalized minimal irresolute maps are introduced and characterized in topological spaces.
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