funktionsfält

Funktionsfält, or function field, is a central concept in algebraic geometry and number theory. Let k be a base field and X an integral variety over k. The function field k(X) consists of rational functions on X, i.e., equivalence classes of regular functions on nonempty open subsets, or more formally the field of fractions of the coordinate ring of any nonempty affine open subset. This construction is independent of the chosen open subset and captures the algebraic relations among functions on X.

The field k(X) is a finitely generated field extension of k, and its transcendence degree equals the

Constants and valuations: the subfield of elements of k(X) that are algebraic over k is called the

Applications: function fields provide a framework for studying maps between varieties via field extensions, as well