Well-Ordered Valuations on Rational Function Fields in Two Variables

TL;DR

None

Contribution

None

Abstract

Gr\"obner bases have been generalized by replacing monomial orders with constructions such as valuations and filtrations. We consider suitable valuations on a rational valuation field $K(x,y)$ and analyze their behavior when restricting to an underlying polynomial ring $K[x,y]$. In previous work, the corresponding value groups were subsets of ${\mathbb Q}$, and in this paper we consider the case when the value groups are isomorphic to ${\mathbb Z} \oplus {\mathbb Z}$. Bounds on how the image of $K[x,y]$ grows with respect to degree are given, and then a class a valuations that are suitable for use for generalized Gr\"obner bases are described. We construct an example in which the image of the underlying polynomial ring is non-negative, yet is not well-ordered.