Ideal theory of infinite directed unions of local quadratic transforms

Abstract

Let R be a regular local ring of dimension at least 2. Associated to each valuation domain birationally dominating R, there exists a unique sequence \Rn\ of local quadratic transforms of R along this valuation domain. We consider the situation where the sequence \ Rn \n 0 is infinite, and examine ideal-theoretic properties of the integrally closed local domain S = n 0 Rn. Among the set of valuation overrings of R, there exists a unique limit point V for the sequence of order valuation rings of the Rn. We prove the existence of a unique minimal proper Noetherian overring T of S, and establish the decomposition S = T V. If S is archimedian, then the complete integral closure S* of S has the form S* = W T, where W is the rank 1 valuation overring of V.