axiomatic definition of the real numbers

Axiomatic definition of the real numbers

The real numbers consist of a set $\mathbbmss{R}$ together with mappings $+\colon\mathbbmss{R}\times\mathbbmss{R}\to\mathbbmss{R}$ and $\cdot\colon\mathbbmss{R}\times\mathbbmss{R}\to\mathbbmss{R}$ and a relation $<\,\subseteq\mathbbmss{R}\times\mathbbmss{R}$ satisfying the following conditions:

1.
$(\mathbbmss{R},+)$ is an Abelian group:
1. (a)
  
  For $a,b,c\in\mathbbmss{R}$ , we have
  
  $\displaystyle a+b$ $\displaystyle=$ $\displaystyle b+a,$
  
  $\displaystyle(a+b)+c$ $\displaystyle=$ $\displaystyle a+(b+c),$
2. (b)
  
  there exists an element $0\in\mathbbmss{R}$ such that $a+0=a$ for all $a\in\mathbbmss{R}$ ,
3. (c)
  
  every $a\in\mathbbmss{R}$ has an inverse $(-a)\in\mathbbmss{R}$ such that $a+(-a)=0$ .
2.
$(\mathbbmss{R}\setminus\{0\},\cdot)$ is an Abelian group:
1. (a)
  
  For $a,b,c\in\mathbbmss{R}$ , we have
  
  $\displaystyle a\cdot b$ $\displaystyle=$ $\displaystyle b\cdot a,$
  
  $\displaystyle(a\cdot b)\cdot c$ $\displaystyle=$ $\displaystyle a\cdot(b\cdot c),$
2. (b)
  
  there exists an element $1\in\mathbbmss{R}\setminus\{0\}$ such that $a\cdot 1=a$ for all $a\in\mathbbmss{R}$ ,
3. (c)
  
  every $a\in\mathbbmss{R}\setminus\{0\}$ has an inverse $a^{-1}\in\mathbbmss{R}$ such that $a^{-1}\cdot a=1$ .
3.

The operation $\cdot$ is distributive over $+$ : If $a,b,c\in\mathbbmss{R}$ , then

$\displaystyle a\cdot(b+c)$ $\displaystyle=a\cdot b+a\cdot c,$

$\displaystyle(b+c)\cdot a$ $\displaystyle=b\cdot a+c\cdot a.$
4.
$(\mathbbmss{R},<)$ is a total order:
1. (a)
  
  (transitivity) if $c\in\mathbbmss{R}$ , $a<b$ , and $b<c$ , then $a<c$ ,
2. (b)
  
  (trichotomy) precisely one of the below alternatives hold:
  
  $a<b,\quad a=b,\quad b<a.$
For convenience we make the following notational definitions: $a>b$ means $b<a$ , $a\leq b$ means either $a<b$ or $a=b$ , and $a\geq b$ means either $b<a$ or $a=b$ .
5.
The operations $+$ and $\cdot$ are compatible with the order $<$ :
1. (a)
  
  If $a$ , $b$ , $c\in\mathbbmss{R}$ and $a<b$ , then $a+c<b+c$ .
2. (b)
  
  If $a$ , $b$ , $c\in\mathbbmss{R}$ with $a<b$ and $0<c$ , then $ac<bc$ .
6.

$\mathbbmss{R}$ has the least upper bound property: If $A\subset\mathbbmss{R}$ , then an element $M\in\mathbbmss{R}$ is an for $A$ if

$a<M,\mbox{ for all }\ a\in A.$

If $A$ is non-empty, we then say that $A$ is bounded from above. That $\mathbbmss{R}$ has the least upper bound property means that if $A\subset\mathbbmss{R}$ is bounded from above, it has a least upper bound $m\in\mathbbmss{R}$ . That is, $A$ has an upper bound $m$ such that if $M$ is any upper bound from $M$ , then $m\leq M$ .

Here it should be emphasized that from the above we can not deduce that a set $\mathbbmss{R}$ with operations $+,\cdot,<$ exists. To settle this question such a set has to be explicitly constructed. However, this can be done in various ways, as discussed on this page (http://planetmath.org/RealNumber). One can also show the above conditions uniquely determine the real numbers (up to an isomorphism). The proof of this can be found on this page (http://planetmath.org/EveryOrderedFieldWithTheLeastUpperBoundPropertyIsIsomorphicToTheRealNumbers).

Basic properties

In condensed form, the above conditions state that $\mathbbmss{R}$ is an ordered field with the least upper bound property. In particular $(\mathbbmss{R},+,\cdot)$ is a ring, and $(\mathbbmss{R}\setminus\{0\},\cdot)$ is a group, and we have the following basic properties:

Lemma 1.

Suppose $a,b\in\mathbbmss{R}$ .

1.

The additive inverse $(-a)$ is unique (proof) (http://planetmath.org/UniquenessOfAdditiveIdentityInARing).
2.

The additive identity $0$ is unique (proof) (http://planetmath.org/UniquenessOfAdditiveIdentityInARing2).
3.

$(-1)\cdot a=(-a)$ (proof) (http://planetmath.org/1cdotAA).
4.

$(-a)\cdot(-b)=a\cdot b$ (proof) (http://planetmath.org/XcdotYXcdotY).
5.

$0\cdot a=0$ (proof) (http://planetmath.org/0cdotA0)
6.

The multiplicative inverse $a^{-1}$ is unique (proof) (http://planetmath.org/UniquenessOfInverseForGroups).
7.

If $a, b$ are non-zero, then $(ab)^{-1}=b^{-1}a^{-1}$ (proof) (http://planetmath.org/InverseOfAProduct).

In view of property 2, we can write simply $-a$ instead of $(-1)\cdot a$ and $(-a)$ .

Because of the additive inverse of a real number is unique (by property 1 above), and $(-a)+a=a+(-a)=0$ , we see that the additive inverse of $-a$ is $a$ , or that $-(-a)=a$ . Similarly, if $a\neq 0$ , then $a^{-1}\neq 0$ (or we’ll end up with $1=aa^{-1}=a0=0$ ), and therefore by Property 6 above, $a^{-1}$ has a unique multiplicative inverse. Since $aa^{-1}=a^{-1}a=1$ , we see that $a$ is the multiplicative inverse of $a^{-1}$ . In other words, $(a^{-1})^{-1}=a$ .

For $a,b\in\mathbbmss{R}$ let us also define $a-b=a+(-b)$ , which is called the difference of $a$ and $b$ . By commutativity, $a-b=-b+a$ . It is also common to leave out the multiplication symbol and simply write $ab=a\cdot b$ . Suppose $a\in\mathbbmss{R}$ and $b\in\mathbbmss{R}$ is non-zero. Then $b$ divided (http://planetmath.org/Division) by $a$ is defined as

\frac{a}{b}=ab^{-1}.

In consequence, if $a,\,b,\,c,\,d\in\mathbbmss{R}$ and $b,\,c,\,d$ are non-zero, then

•

$\frac{\frac{a}{b}}{\frac{c}{d}}=\frac{bd}{ac}$ ,
•

$\frac{ab}{b}=a$ .

For example,

\frac{\frac{a}{b}}{\frac{c}{d}}=\frac{ab^{-1}}{cd^{-1}}=ab^{-1}(cd^{-1})^{-1}=% ab^{-1}dc^{-1}=\frac{ad}{bc}.

Title	axiomatic definition of the real numbers
Canonical name	AxiomaticDefinitionOfTheRealNumbers
Date of creation	2013-03-22 15:39:29
Last modified on	2013-03-22 15:39:29
Owner	matte (1858)
Last modified by	matte (1858)
Numerical id	17
Author	matte (1858)
Entry type	Definition
Classification	msc 54C30
Classification	msc 26-00
Classification	msc 12D99
Related topic	RealNumber

	$\displaystyle a+b$	$\displaystyle=$	$\displaystyle b+a,$
	$\displaystyle(a+b)+c$	$\displaystyle=$	$\displaystyle a+(b+c),$

	$\displaystyle a\cdot b$	$\displaystyle=$	$\displaystyle b\cdot a,$
	$\displaystyle(a\cdot b)\cdot c$	$\displaystyle=$	$\displaystyle a\cdot(b\cdot c),$

	$\displaystyle a\cdot(b+c)$	$\displaystyle=a\cdot b+a\cdot c,$
	$\displaystyle(b+c)\cdot a$	$\displaystyle=b\cdot a+c\cdot a.$