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有序域

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在数学的一个分支代数中，有序域是一个全序关系通过加法和乘法运算不被改变的域。有序域最常见的例子是实数。

定义

一个满足下面两个条件的、拥有全序关系 $\leq$ 的域 $(K,+,\cdot )$ 被定义为有序域：对于任何 $K$ 中的元素 $a,b,c$ 以下两个条件获得满足：

若 $a\leq b$ ，则 $a+c\leq b+c$ 。
若 $0\leq a$ 且 $0\leq b$ ，则 $0\leq a\cdot b$ 。

大于0的元素被称为是正的，小于0的元素被称为是负的。

特性

由以上定义可以直接推导出以下特性（ $a,b,c,d$ 是 $K$ 的元素）：

一个正的元素的负数是负的，一个负的元素的负数是正的：即任何 $K$ 中的 $a$ ，假如 $a\neq 0$ 则 $-a<0<a$ 或 $a<0<-a$ 。
不等式可以相加： $a\leq b$ 和 $c\leq d$ 则 $a+c\leq b+d$ 。
不等式可以与正元素相乘： $a\leq b$ 和 $0\leq c$ 则 $ac\leq bc$ 。
平方数不是负的： ${\displaystyle 0\leq a^{2))$ ，尤其 $0<1$ 。
通过数学归纳法可以推导出任何一的有限的和是正的： $0<1+1+\cdots +1$ 。

结构

所有有序域都具有特征数0。这个结论直接出于上述的最后一个特性 $0<1+1+\cdots +1$ 。

每个有序域的子域也是有序域。任何含特征数0的域其最小子域与有理数同構，且这个子域的排序与 $\mathbb {Q}$ 一致。

假如一个有序域中的任何元素都介于两个有理数之间的话，则该域具有阿基米德性质。比如实数是具有阿基米德性质的，而超实数则不具有。

有序域 $K$ 的排序可用來定義 $K$ 的拓扑空间，这个拓扑空间可由 ${\displaystyle \{x\in K\mid x<a\))$ 和 ${\displaystyle \{x\in K\mid x>a\))$ 作為準基來生成，稱之為序拓撲。加法和乘法运算相对于这个拓扑空间是连续的。

例子

有理数 $\mathbb {Q}$ 组成最小的有序域
实数 $\mathbb {R}$ 和其中的任何部分域
超实数

分类

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