Affiliation:
1. Department of Mathematics, University of Delhi, New Delhi, India
Abstract
A space X is said to be cellular-countably compact if for each cellular
family U in X, there is a countably compact subspace K of X such that U ? K
?? for each U ? U. The class of cellularcountably compact spaces contain
the classes of countably compact spaces and cellular-compact spaces and
contained in a class of pseudocompact spaces. We give an example of
Tychonoff DCCC space which is not cellular-countably compact. By using
Erd?s and Rad??s theorem, we establish the cardinal inequalities for
cellular-countably compact spaces. We show that the cardinality of a normal
cellular-countably compact space with a G?-diagonal is at most c. Finally,
we study the topological behavior of cellular-countably compact spaces on
subspaces and products.
Publisher
National Library of Serbia