Cardinal invariants of cellular-Lindelof spaces

Abstract

A space X is said to be "cellular-Lindel\"of" if for every cellular family U there is a Lindel\"of subspace L of X which meets every element of U. Cellular-Lindel\"of spaces generalize both Lindel\"of spaces and spaces with the countable chain condition. Solving questions of Xuan and Song, we prove that every cellular-Lindel\"of monotonically normal space is Lindel\"of and that every cellular-Lindel\"of space with a regular Gδ-diagonal has cardinality at most 2c. We also prove that every normal cellular-Lindel\"of first-countable space has cardinality at most continuum under 2<c=c and that every normal cellular Lindel\"of space with a Gδ-diagonal of rank 2 has cardinality at most continuum.