Verbal covering properties of topological spaces

Abstract

For any topological space X we study the relation between the universal uniformity UX, the universal quasi-uniformity q UX and the universal pre-uniformity p UX on X. For a pre-uniformity U on a set X and a word v in the two-letter alphabet \+,-\ we define the verbal power Uv of U and study its boundedness numbers ( Uv) and ( Uv). The boundedness numbers of the (Boolean operations over) the verbal powers of the canonical pre-uniformities p UX, q UX and UX yield new cardinal characteristics v(X), v(X), qv(X), q v(X), u(X) of a topological space X, which generalize all known cardinal topological invariants related to (star)-covering properties. We study the relation of the new cardinal invariants v, v to classical cardinal topological invariants such as Lindel\"of number , density d, and spread s. The simplest new verbal cardinal invariant is the foredensity -(X) defined for a topological space X as the smallest cardinal such that for any neighborhood assignment (Ox)x∈ X there is a subset A⊂ X of cardinality |A| that meets each neighborhood Ox, x∈ X. It is clear that -(X) d(X) -(X)· (X). We shall prove that -(X)=d(X) if |X|<ω. On the other hand, for every singular cardinal (with 22cf()) we construct a (totally disconnected) T1-space X such that -(X)=cf()<=|X|=d(X).