Lüroth's theorem

Statement

Let ${\displaystyle K}$ be a field, and ${\displaystyle K(t)}$ be the field of univariate rational functions, i.e., the field of rational functions in one variable over ${\displaystyle K}$. Then, any subfield of ${\displaystyle K(t)}$ properly containing ${\displaystyle K}$ is of the form ${\displaystyle K(f(t))}$, where ${\displaystyle f}$ is a rational function. In particular, this subfield is again the field of univariate rational functions, with the variable now being ${\displaystyle f(t)}$.

In other words, any nontrivial sub-extension of a simple transcendental extension is again a simple transcendental extension.

Related facts

• Castelnuovo's theorem