proof of Bezout’s Theorem

Let $D$ be an integral domain with an Euclidean valuation. Let $a,b\in D$ not both 0. Let $(a,b)=\{ax+by|x,y\in D\}$ . $(a,b)$ is an ideal in $D\neq\{0\}$ . We choose $d\in(a,b)$ such that $\mu(d)$ is the smallest positive value. Then $(a,b)$ is generated by $d$ and has the property $d|a$ and $d|b$ . Two elements $x$ and $y$ in $D$ are associate if and only if $\mu(x)=\mu(y)$ . So $d$ is unique up to a unit in $D$ . Hence $d$ is the greatest common divisor of $a$ and $b$ .

Title	proof of Bezout’s Theorem
Canonical name	ProofOfBezoutsTheorem
Date of creation	2013-03-22 13:19:58
Last modified on	2013-03-22 13:19:58
Owner	Thomas Heye (1234)
Last modified by	Thomas Heye (1234)
Numerical id	7
Author	Thomas Heye (1234)
Entry type	Proof
Classification	msc 13F07