Extending valuations of local domains to complete local domains without changing the value group
Abstract
Let (R,m,k) be an excellent local noetherian domain with field of fractions K. Let ν:K*Γ be a valuation centered at R and let Rν be the corresponding valuation ring of K, dominating R. Denote by R the m-adic completion of R. In the applications of valuation theory to commutative algebra and the study of singularities, one is often induced to replace R by its m-adic completion R and ν by a suitable extension ν- to RP for a suitably chosen prime ideal P, such that P R=(0). In a previous article we gave a systematic description of all such extensions ν- and defined the notion of tight extensions that are of particular interest for applications (see Herrera, Olalla, Spivakovsky and Teissier, Extending a valuation centered in a local domain to its formal completion, Proc. London Math. Soc. (3) 105 (2012) 571--621). If ν- is a tight extension then its graded algebra is birational to that of ν (the converse is not known and might not be true). In particular, the value group of ν- is Γ. The existence of tight extensions was conjectured by the last author (see Teissier, Valuations, deformations, and toric geometry, Fields Institute Communications, 33, 2003, 361-459). In the present paper we give a proof of Teissier's conjecture. An intended application of this result is an important step in two recent approaches to local uniformization in positive characteristic.
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