On complete integral closedness of the p-adic completion of absolute integral closure
Abstract
Fix a prime p and let (R,m) be a Noetherian complete local domain of mixed characteristic (0,p) with fraction field K. Let R+ denote the absolute integral closure of R, which is the integral closure of R in an algebraic closure K of K. The first author has shown that R+, the p-adic completion of R+, is an integral domain. In this paper, we prove that R+ is completely integrally closed in R+R+K, but R+ is not completely integrally closed in its own fraction field when (R)≥ 2.
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