On Functorial Lindel\"ofifiability

Abstract

In the present paper, we prove that a topological space admits a functorial Lindel\"ofification if and only if its realcompactification is Lindel\"of. To investigate the functorial Lindel\"ofifiability of a topological space, for each topological property P, we introduce the notion of "functorial P-ification" and give an explicit construction of the functorial P-ification. Moreover, for a discrete space X, we discuss the functorial |X|-Lindel\"ofifiability of X and study relationships with properties of the cardinal |X|. Finally, we apply our results concerning functorial -Lindel\"ofifiability (for some cardinal ) to the space of ordinals and construct several functorial -Lindel\"ofifiable spaces.