PlanetMath: function field

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function field

(Definition)

Let be a field.

Definition 1 The rational function field over in one variable (), denoted by , is the field of all rational functions with polynomials $p,q\in F[x]$ and not identically zero.

Definition 2 A function field (in one variable) over is a field , containing and at least one element , transcendental over , such that is a finite algebraic extension.

Let $\overline{F}$ be a fixed algebraic closure of .

Definition 3 Let be a function field over and let be a finite extension of . The extension of function fields is said to be geometric if $L\cap \overline{F}=F$ .

Example 1 The extension $\mathbb{Q}(\sqrt{x})/\mathbb{Q}(x)$ is geometric, but $\mathbb{Q}(\sqrt{2})(x)/\mathbb{Q}(x)$ is not geometric.

Theorem 1 (Thm. I.6.9 of [1]) Let be a function field over an algebraically closed field . There exists a nonsingular projective curve such that the function field of is isomorphic to .

Definition 4 Let be a function field over a field . Let $K'=K\overline{F}$ which is a function field over $\overline{F}$ , a fixed algebraic closure of , and let $C_{K'}$ be the curve given by the previous theorem. The genus of is, by definition, the genus of $C_{K'}$ .

Definition 5 Let be a function field over a field . A prime in is by definition a discrete valuation ring with maximal such that $F\subset R$ and the quotient field of is equal to . The prime is usually denoted after the maximal ideal of . The degree of , denoted by $\deg P$ , is defined to be the dimension of over .

Example 2 Let

be the rational function field over

and let $\mathcal{O}=F[x]$ . The prime ideals of $\mathcal{O}$ are generated by monic irreducible polynomials in

. Let

be such a prime. Then $R_P=\mathcal{O}_P$ , the localization of $\mathcal{O}$ at the prime

is a discrete valuation ring with $F\subset \mathcal{O}_P$ and the quotient field of

. Thus $R_P=\mathcal{O}_P$ is a prime of

One can define an `extra' prime in the following way. Let $R_\infty=\mathcal{O}_\infty=F[\frac{1}{x}]$ and let $P_\infty=(\frac{1}{x})$ be the prime ideal of $R_\infty$ generated by $\frac{1}{x}$ . The localization ring $(R_\infty)_{P_\infty}$ is a prime of , called the prime at infinity.