Algebraic norm in a number field

Definition

The algebraic norm in a number field is a map from the number field to the field of rational numbers, defined as follows. If the number field has degree ${\displaystyle d}$, the minimal polynomial of a given element ${\displaystyle x}$ has degree ${\displaystyle d_{1}}$, and the constant term of its minimal monic polynomial is ${\displaystyle a_{0}}$, we define:

${\displaystyle N(x)=(-1)^{d}a_{0}^{d/d_{1}}}$.

Notice that this is not an integer-valued function on a number field; however, its restriction to the ring of integers is an integer-valued function, and hence a norm on a commutative unital ring. However, that norm need not necessarily be a nonnegative norm.

Facts

• The algebraic norm in any number field is multiplicative: the norm of a product of elements equals the product of their norms. For full proof, refer: algebraic norm in a number field is multiplicative
• The norm is nonzero on all nonzero elements.