Primitive element theorem

Statement

Suppose ${\displaystyle L/K}$ is a finite extension of fields, i.e., the degree of the extension is finite. The primitive element theorem states that there exists an element ${\displaystyle \alpha \in L}$ such that ${\displaystyle L=K(\alpha )}$. In other words, the extension can be generated by a single element over ${\displaystyle K}$. Such an element is termed a primitive element.

Related facts

• Normal basis theorem states that any finite Galois extension has a basis (as a vector space over the base field) that forms a single orbit under the action of the Galois group.