Adaptive quadrature

In topology, a preclosure operator, or Čech closure operator is a map between subsets of a set, similar to a topological closure operator, except that it is not required to be idempotent. That is, a preclosure operator obeys only three of the four Kuratowski closure axioms.

Definition

A preclosure operator on a set ${\displaystyle X}$ is a map ${\displaystyle [{]}_p}$

${\displaystyle [{]}_p:\mathcal{𝒫}(X)\to \mathcal{𝒫}(X)}$

where ${\displaystyle \mathcal{𝒫}(X)}$ is the power set of ${\displaystyle X}$.

The preclosure operator has to satisfy the following properties:

1. ${\displaystyle [\varnothing {]}_p=\varnothing }$ (Preservation of nullary unions);
2. ${\displaystyle A\subseteq [A{]}_p}$ (Extensivity);
3. ${\displaystyle [A\cup B{]}_p=[A{]}_p\cup [B{]}_p}$ (Preservation of binary unions).

The last axiom implies the following:

4. ${\displaystyle A\subseteq B}$ implies ${\displaystyle [A{]}_p\subseteq [B{]}_p}$.

Topology

A set ${\displaystyle A}$ is closed (with respect to the preclosure) if ${\displaystyle [A{]}_p=A}$. A set ${\displaystyle U\subset X}$ is open (with respect to the preclosure) if ${\displaystyle A=X\setminus U}$ is closed. The collection of all open sets generated by the preclosure operator is a topology.

The closure operator cl on this topological space satisfies ${\displaystyle [A{]}_p\subseteq \mathrm{cl}(A)}$ for all ${\displaystyle A\subset X}$.

Examples

Premetrics

Given ${\displaystyle d}$ a premetric on ${\displaystyle X}$, then

${\displaystyle [A{]}_p=\{x\in X:d(x,A)=0\}}$

is a preclosure on ${\displaystyle X}$.

Sequential spaces

The sequential closure operator ${\displaystyle [{]}_{\text{seq}}}$ is a preclosure operator. Given a topology ${\displaystyle \mathcal{𝒯}}$ with respect to which the sequential closure operator is defined, the topological space ${\displaystyle (X,\mathcal{𝒯})}$ is a sequential space if and only if the topology ${\displaystyle {\mathcal{𝒯}}_{\text{seq}}}$ generated by ${\displaystyle [{]}_{\text{seq}}}$ is equal to ${\displaystyle \mathcal{𝒯}}$, that is, if ${\displaystyle {\mathcal{𝒯}}_{\text{seq}}=\mathcal{𝒯}}$.

See also

• Eduard Čech

References

• A.V. Arkhangelskii, L.S.Pontryagin, General Topology I, (1990) Springer-Verlag, Berlin. ISBN 3-540-18178-4.
• B. Banascheski, Bourbaki's Fixpoint Lemma reconsidered, Comment. Math. Univ. Carolinae 33 (1992), 303-309.