Definition:Arc-Connected/Subset
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Definition
Let $T = \struct {S, \tau}$ be a topological space.
Let $U \subseteq S$ be a subset of $T$.
Let $T' = \struct {U, \tau_U}$ be the subspace of $T$ induced by $U$.
Then $U$ is arc-connected in $T$ if and only if every two points in $U$ are arc-connected in $T'$.
That is, $U$ is arc-connected if and only if:
- for every $x, y \in U$, there exists a continuous injection $f: \closedint 0 1 \to S$ such that $\map f 0 = x$ and $\map f 1 = y$.
Also known as
The term arc-connected can also be seen unhyphenated: arc connected.
Some sources also refer to this condition as:
but the extra syllable does not appear to add to the understanding.
Also see
- Results about arc-connected spaces can be found here.