Closed set: Difference between revisions

In mathematics, a set ${\displaystyle A\subset X}$, where ${\displaystyle (X,O)}$ is some topological space, is said to be closed if ${\displaystyle X-A=\{x\in X\mid x\notin A\}}$, the complement of ${\displaystyle A}$ in ${\displaystyle X}$, is an open set

Examples

1. Let ${\displaystyle X=(0,1)}$ with the usual topology induced by the Euclidean distance. Open sets are then of the form ${\displaystyle \cup _{\gamma \in \Gamma }(a_{\gamma },b_{\gamma })}$ where ${\displaystyle 0\leq a_{\gamma }<b_{\gamma }\leq 1}$ and ${\displaystyle \Gamma }$ is an arbitrary index set. Then closed sets by definition are of the form ${\displaystyle \cap _{\gamma \in \Gamma }(0,a_{\gamma }]\cap [b_{\gamma },1)}$.

2. As a more interesting example, consider the function space ${\displaystyle C[a,b]}$ consisting of all real valued continuous functions on the interval [a,b] (a<b) endowed with a topology induced by the distance ${\displaystyle d(f,g)=\mathop {\max } _{x\in [a,b]}|f(x)-g(x)|}$. In this topology, the sets

${\displaystyle A=\{g\in C[a,b]\mid \mathop {\min } _{x\in [a,b]}g(x)>0\}}$

and

${\displaystyle B=\{g\in C[a,b]\mid \mathop {\min } _{x\in [a,b]}g(x)<0\}}$

are open sets while the sets

${\displaystyle C=\{g\in C[a,b]\mid \mathop {\min } _{x\in [a,b]}g(x)\geq 0\}=C[a,b]-B}$

and

${\displaystyle D=\{g\in C[a,b]\mid \mathop {\min } _{x\in [a,b]}g(x)\leq 0\}=C[a,b]-A}$

are closed (the sets ${\displaystyle C}$ and ${\displaystyle D}$ are, respectively, the closure of the sets ${\displaystyle A}$ and ${\displaystyle B}$, respectively).

See also

Topology

Analysis