Valuation Extensions of Algebras Defined by Monic Gr\"obner Bases

Abstract

Let K be a field, Ov a valuation ring of K associated to a valuation v: K→\∞\, and mv the unique maximal ideal of Ov. Consider an ideal I of the free K-algebra K X =K X1,...,Xn on X1,...,Xn. If I is generated by a subset G⊂ Ov X which is a monic Gr\"obner basis of I in K X, where Ov X =Ov X1,...,Xn is the free Ov-algebra on X1,...,Xn, then the valuation v induces naturally an exhaustive and separated -filtration FvA for the K-algebra A=K X / I, and moreover Iv X = holds in Ov X; it follows that, if furthermore G⊂ mvOv X and k X / G is a domain, where k=Ov/ mv is the residue field of Ov, k X =k X1,...,Xn is the free k-algebra on X1,...,Xn, and G is the image of G under the canonical epimorphism Ov X→ k X, then FvA determines a valuation function A→ \∞\, and thereby v extends naturally to a valuation function on the (skew-)field of fractions of A provided exists.