The ruled residue theorem for simple transcendental extensions of valued fields

Abstract:

A proof is given for the Ruled Residue Conjecture, which asserts that if $\upsilon$ is a valuation of a simple transcendental field extension ${K_0}(x)$ and ${\upsilon _0}$ is the restriction of $\upsilon$ to ${K_0}$, then the residue field of $\upsilon$ is either ruled or algebraic over the residue field of ${\upsilon _0}$.