Quasicomponent

Definition

Definition in terms of equivalence relation

Consider the following relation ${\displaystyle \!\sim }$ on a topological space ${\displaystyle X}$. For points ${\displaystyle a,b\in X}$, we say ${\displaystyle a\sim b}$ if it is not possible to write ${\displaystyle X}$ as a union of disjoint open subsets ${\displaystyle U,V}$ with ${\displaystyle a\in U,b\in V}$.

This relation is an equivalence relation and the equivalence classes in ${\displaystyle X}$ under the relation are termed the quasicomponents of ${\displaystyle X}$.

Definition as intersection of clopen subsets

For a topological space ${\displaystyle X}$, the quasicomponent of a point ${\displaystyle x\in X}$ is defined as the intersection of all the clopen subsets containing ${\displaystyle x}$.

Equivalence of definitions

Further information: equivalence of definitions of quasicomponent

Related notions

• Connected component is a maximal non-empty connected subset. In general, each quasicomponent is a union of connected components. In other words, the equivalence relation defining quasicomponents is coarser than the equivalence relation defining connected components. Further information: quasicomponent is union of connected components
• Any open connected component is a quasicomponent. In particular, a locally connected space is a space in which all connected components are open, and hence the connected components are all open and hence coincide with the quasicomponents.