Difference between revisions of "Discrete topology"
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The equivalence alluded to above is obtained as follows: If $P$ is a pre-ordered set (cf. [[Pre-order|Pre-order]]), then define $O_x = \{ y \in P : y \le x \}$ for $x \in P$. With the topology generated by the sets $O_x$, $P$ becomes a [[Discrete space|discrete space]]. | The equivalence alluded to above is obtained as follows: If $P$ is a pre-ordered set (cf. [[Pre-order|Pre-order]]), then define $O_x = \{ y \in P : y \le x \}$ for $x \in P$. With the topology generated by the sets $O_x$, $P$ becomes a [[Discrete space|discrete space]]. | ||
− | If $X$ is a discrete space, put $O_x = \cap \{ O : x \in O, \ O \text open} \}$ for $x \in X$. Then $y \le x$ if and only if $y \in O_x$, defines a pre-order on $X$. | + | If $X$ is a discrete space, put $O_x = \cap \{ O : x \in O, \ O \text{open} \}$ for $x \in X$. Then $y \le x$ if and only if $y \in O_x$, defines a pre-order on $X$. |
These constructions are each others inverses. Moreover, discrete $T_0$-spaces correspond to partial orders and "real" discrete spaces correspond to discrete orders. | These constructions are each others inverses. Moreover, discrete $T_0$-spaces correspond to partial orders and "real" discrete spaces correspond to discrete orders. |
Revision as of 20:19, 31 October 2014
on a set $X$
The topology in which every set is open (and therefore every set is closed). The discrete topology is the largest element in the lattice of all topologies on the given set. The term "discrete topology" is sometimes understood in a somewhat wider sense, viz. as a topology in which intersections of arbitrary numbers of open sets are open. In the case of $T_1$-spaces, both definitions coincide. In this sense, the theory of discrete spaces is equivalent to the theory of partially ordered sets.
References
[1] | P.S. Aleksandrov, "Diskrete Räume" Mat. Sb. , 2 (1937) pp. 501–520 |
Comments
The equivalence alluded to above is obtained as follows: If $P$ is a pre-ordered set (cf. Pre-order), then define $O_x = \{ y \in P : y \le x \}$ for $x \in P$. With the topology generated by the sets $O_x$, $P$ becomes a discrete space.
If $X$ is a discrete space, put $O_x = \cap \{ O : x \in O, \ O \text{open} \}$ for $x \in X$. Then $y \le x$ if and only if $y \in O_x$, defines a pre-order on $X$.
These constructions are each others inverses. Moreover, discrete $T_0$-spaces correspond to partial orders and "real" discrete spaces correspond to discrete orders.
This simple idea and variations thereof have proven to be extremely fruitful, see, e.g., [a1].
References
[a1] | G. Gierz, K.H. Hofmann, K. Keimel, J.D. Lawson, M.V. Mislove, D.S. Scott, "A compendium of continuous lattices" , Springer (1980) |
Discrete topology. Encyclopedia of Mathematics. URL: http://encyclopediaofmath.org/index.php?title=Discrete_topology&oldid=34127