Multiplicatively monotone Euclidean norm: Difference between revisions

Latest revision as of 22:41, 22 January 2009

This article defines a property that can be evaluated for a Euclidean norm on a commutative unital ring

Definition

A Euclidean norm is termed multiplicatively monotone if the norm of a nonzero product of two elements is at least equal to the norms of the elements. In symbols, if $N$ is a Euclidean norm on a commutative unital ring $R$ , we say that $N$ is multiplicatively monotone if for any $a,b\in R$ such that $ab\neq 0$ :

$N(ab)\geq \max\{N(a),N(b)\}$ .

Relation with other properties

Stronger properties

Multiplication-additive Euclidean norm: Here, the norm of a product equals the sum of the norms.
Multiplicative Euclidean norm as long as there are no elements of norm zero.

Facts

A multiplicatively monotone Euclidean norm takes the same value on associate elements. For full proof, refer: Multiplicatively monotone Euclidean norm is constant on associate classes
If $b|a$ for $b\neq 0$ in an integral domain with a multiplicatively monotone Euclidean norm, then there is no pair $(q,r)$ with $a=bq+r$ , $r\neq 0$ and $N(r)<N(b)$ . For full proof, refer: Multiplicatively monotone Euclidean norm admits unique Euclidean division for exact divisor
A Euclidean norm that is both filtrative and multiplicatively monotone is a uniquely Euclidean norm. For full proof, refer: filtrative and multiplicatively monotone implies uniquely Euclidean

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 ==Definition==
-A [[Euclidean norm]] is termed '''multiplicatively monotone''' if the norm of a product of two elements is at least equal to the norms of the elements. In symbols, if <math>N</math> is a Euclidean norm on a commutative unital ring <math>R</math>, we say that <math>N</math> is multiplicatively monotone if for any <math>a,b \in R</math> such that <math>ab \ne 0</math>:
+A [[Euclidean norm]] is termed '''multiplicatively monotone''' if the norm of a nonzero product of two elements is at least equal to the norms of the elements. In symbols, if <math>N</math> is a Euclidean norm on a commutative unital ring <math>R</math>, we say that <math>N</math> is multiplicatively monotone if for any <math>a,b \in R</math> such that <math>ab \ne 0</math>:
 <math>N(ab) \ge \max \{ N(a), N(b) \}</math>.
@@ Line 16: / Line 16: @@
 ==Facts==
+* A multiplicatively monotone Euclidean norm takes the same value on [[associate elements]]. {{proofat|[[Multiplicatively monotone Euclidean norm is constant on associate classes]]}}
+* If <math>b|a</math> for <math>b \ne 0</math> in an [[integral domain]] with a multiplicatively monotone Euclidean norm, then there is no pair <math>(q,r)</math> with <math>a = bq + r</math>, <math>r \ne 0</math> and <math>N(r) < N(b)</math>. {{proofat|[[Multiplicatively monotone Euclidean norm admits unique Euclidean division for exact divisor]]}}
 * A Euclidean norm that is both [[filtrative Euclidean norm|filtrative]] and multiplicatively monotone is a [[uniquely Euclidean norm]]. {{proofat|[[filtrative and multiplicatively monotone implies uniquely Euclidean]]}}