# Pages that link to "Books:Introduction to Topology - Bert Mendelson"

From Maths

The following pages link to **Books:Introduction to Topology - Bert Mendelson**:

- Topological space (← links)
- Open set (← links)
- Open ball (← links)
- Connected (topology) (← links)
- Compactness (← links)
- Hausdorff space (← links)
- Template:RITTBM (← links)
- Topological space/Definition (← links)
- Interior point (topology) (← links)
- Interior (← links)
- A subset of a topological space is open if and only if it is a neighbourhood to all of its points (← links)
- Notes:Quotient topology/Table (← links)
- Disconnected (topology) (← links)
- A topological space is connected if and only if the only sets that are both open and closed in the space are the entire space itself and the emptyset (← links)
- A subset of a topological space is disconnected if and only if it can be covered by two non-empty-in-the-subset and disjoint-in-the-subset sets that are open in the space itself (← links)
- Connected (topology)/Equivalent conditions (← links)
- A subset of a topological space is disconnected if and only if it can be covered by two non-empty-in-the-subset and disjoint-in-the-subset sets that are open in the space itself/Statement (← links)
- The image of a connected set is connected (← links)
- A map is continuous if and only if the pre-image of every closed set is closed (← links)
- If the intersection of two open balls is non-empty then for every point in the intersection there is an open ball containing it in the intersection (← links)
- Interior (topology) (← links)