Search by property
This page provides a simple browsing interface for finding entities described by a property and a named value. Other available search interfaces include the page property search, and the ask query builder.
List of results
- Compactness is weakly hereditary +
- Complete regularity is hereditary +
- Connectedness is product-closed +
- Contractibility is product-closed +
- Contractibility is retract-hereditary +
- Fixed-point property is retract-hereditary +
- Hausdorffness is hereditary +
- Hausdorffness is product-closed +
- Normality is weakly hereditary +
- Regularity is hereditary +
- Tube lemma +
- Second-countability is hereditary +
- Baire property is open subspace-closed +
- T1 is hereditary +
- Hausdorffness is refining-preserved +
- First-countability is hereditary +
- Paracompactness is weakly hereditary +
- Orthocompactness is weakly hereditary +
- Monotone normality is hereditary +
- Metrizability is hereditary +
- Perfect normality is hereditary +
- Urysohn is refining-preserved +
- Compactness is continuous image-closed +
- Compactness is coarsening-preserved +
- Connectedness is continuous image-closed +
- Pseudocompactness is continuous image-closed +
- Compactness is not hereditary +
- Suspension of contractible space is contractible +
- Acyclicity is product-closed +
- Noetherianness is hereditary +
- Urysohn is hereditary +
- Collectionwise Hausdorffness is hereditary +
- Normality is not hereditary +
- Complete regularity is product-closed +
- Path-connected and T1 with at least two points implies uncountable +
- Connectedness is connected union-closed +
- Connectedness is closure-preserved +
- Connectedness is not box product-closed +
- Locally compact and dense-in-itself implies resolvable +
- Resolvability is open subspace-closed +
- Functional Hausdorffness is hereditary +
- Hausdorffness is closure-local +
- Ultraconnectedness is weakly hereditary +
- Irreducibility is open subspace-closed +
- Self-homeomorphism group of locally connected locally compact Hausdorff space is a T0 topological group under the compact-open topology +
- Connectedness is not hereditary +
- Connectedness is not weakly hereditary +
- Compactness is not box product-closed +
- Contractibility is not closure-preserved +