The weight and Lindel\"of property in spaces and topological groups

Abstract

We show that if Y is a dense subspace of a Tychonoff space X, then w(X)≤ nw(Y)Nag(Y), where Nag(Y) is the Nagami number of Y. In particular, if Y is a Lindel\"of -space, then w(X)≤ nw(Y)ω≤ nw(X)ω. Better upper bounds for the weight of topological groups are given. For example, if a topological group H contains a dense subgroup G such that G is a Lindel\"of -space, then w(H)=w(G)≤ (G)ω. Further, if a Lindel\"of -space X generates a dense subgroup of a topological group H, then w(H)≤ 2(X). Several facts about subspaces of Hausdorff separable spaces are established. It is well known that the weight of a separable Hausdorff space X can be as big as 22 c, where c=2ω. We prove on the one hand that if a regular Lindel\"of -space Y is a subspace of a separable Hausdorff space, then w(Y)≤ c, and the same conclusion holds for a Lindel\"of P-space Y. On the other hand, we present an example of a countably compact topological group G which is homeomorphic to a subspace of a separable Hausdorff space and satisfies w(G)=22 c, i.e. has the maximal possible weight.