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discrete space
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(Definition)
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The discrete topology on a set $X$ is the topology given by the power set of $X$ . That is, every subset of $X$ is open in the discrete topology. A space equipped with the discrete topology is called a discrete space.
The discrete topology is the finest topology one can give to a set. Any set with the discrete topology is metrizable by defining $d(x,y)=1$ for any $x,y\in X$ with $x\neq y$ , and $d(x,x)=0$ for any $x\in X$ .
The following conditions are equivalent:
- $X$ is a discrete space.
- Every singleton in $X$ is an open set.
- Every subset of $X$ containing $x$ is a neighborhood of $x$ .
Note that any bijection between discrete spaces is trivially a homeomorphism.
If $Y$ is a subset of $X$ , and the subspace topology on $Y$ is discrete, then $Y$ is called a discrete subspace or discrete subset of $X$ .
Suppose $X$ is a topological space and $Y$ is a subset of $X$ . Then $Y$ is a discrete subspace if and only if, for any $y\in Y$ , there is an open $S\subset X$ such that$$S\cap Y=\{y\}$$
- $\mathbb{Z}$ , as a metric space with the standard distance metric $d(m,n)=|m-n|$ , has the discrete topology.
- $\mathbb{Z}$ , as a subspace of $\mathbb{R}$ or $\mathbb{C}$ with the usual topology, is discrete. But $\mathbb{Z}$ , as a subspace of $\mathbb{R}$ or $\mathbb{C}$ with the trivial topology, is not discrete.
- $\mathbb{Q}$ , as a subspace of $\mathbb{R}$ with the usual topology, is not discrete: any open set containing $q\in \mathbb{Q}$ contains the intersection $U=B(q,\epsilon)\cap \mathbb{Q}$ of an open ball around $q$ with the rationals. By the Archimedean property, there's a rational number
between $q$ and $q+\epsilon$ in $U$ . So $U$ can't contain just $q$ : singletons can't be open.
- The set of unit fractions $F=\{1/n \mid n\in \mathbb{N}\}$ , as a subspace of $\mathbb{R}$ with the usual topology, is discrete. But $F\cup\{0\}$ is not, since any open set containing $0$ contains some unit fraction.
- The product of two discrete spaces is discrete under the product topology. The product of an infinite number of discrete spaces is discrete under the box topology, but if an infinite number of the spaces have more than one element, it is not discrete under the product topology.
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"discrete space" is owned by mathcam. [ full author list (6) | owner history (6) ]
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See Also: discrete
| Other names: |
discrete topological space |
| Also defines: |
discrete subspace, discrete topology, discrete space, discrete subset |
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Cross-references: box topology, number, infinite, product topology, product, unit fractions, rational number, Archimedean property, rationals, open ball, intersection, contains, trivial topology, usual topology, subspace, distance metric, metric space, discrete, subspace topology, homeomorphism, bijection, neighborhood, open set, singleton, metrizable, open, subset, power set, topology
There are 51 references to this entry.
This is version 14 of discrete space, born on 2002-02-27, modified 2005-06-19.
Object id is 2726, canonical name is Discrete.
Accessed 20211 times total.
Classification:
| AMS MSC: | 54-00 (General topology :: General reference works ) |
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Pending Errata and Addenda
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