Path-connected space

This is a variation of connectedness. View other variations of connectedness

Definition

Symbol-free definition

A topological space is said to be path-connected' or arc-wise connected if given any two points on the topological space, there is a path (or an arc) starting at one point and ending at the other.

Definition with symbols

A topological space ${\displaystyle X}$ is said to be path-connected if for any two points ${\displaystyle a,b\in X}$ there is a continuous map ${\displaystyle \gamma :[0,1]\to X}$ such that ${\displaystyle \gamma (0)=a}$ and ${\displaystyle \gamma (1)=b}$.

Relation with other properties

Weaker properties

• Connected space: For full proof, refer: Path-connected implies connected

Metaproperties

Products

This property of topological spaces is closed under taking arbitrary products
View all properties of topological spaces closed under products

A direct product of path-connected spaces is path-connected. This is true both for finite and infinite direct products (using the product topology for infinite direct products).

Coarsening

This property of topological spaces is preserved under coarsening, viz, if a set with a given topology has the property, the same set with a coarser topology also has the property

Shifting to a coarser topology preserves the property of being path-connected. This is because a path in a finer topology continues to remain a path in a coarser topology -- we simply compose with the identity map from the finer to the coarser topology (which, by definition, must be continuous).

Template:Connected union-closed

A union of a family of path-connected subsets having nonempty intersection, is path-connected.