Abstract
We point out that in metric spaces Haver's property is not equivalent to the property introduced by Addis and Gresham. We prove that they are equal when the space has the Hurewicz property. We prove several results about the preservation of Haver's property in products. We show that if a separable metric space has the Haver property, and the nth power has the Hurewicz property, then the nth power has the Addis-Gresham property. R. Pol showed earlier that this is not the case when the Hurewicz property is replaced by the weaker Menger property. We introduce new classes of weakly infinite dimensional spaces.
| Original language | English |
|---|---|
| Pages (from-to) | 1971-1979 |
| Number of pages | 9 |
| Journal | Topology and its Applications |
| Volume | 154 |
| Issue number | 9 |
| DOIs | |
| State | Published - 1 May 2007 |
Keywords
- Countable dimensional
- Haver property
- Hurewicz property
- Menger property
- Selection principle
- Selective screenability
- Strongly countable dimensional
- Weakly infinite dimensional