Some remarks about normal rings
Abstract
We give a constructive proof that R[X] is normal when R is normal. We apply this result to an operation needed for studying the henselization of a local ring. Our proof is based on the case where R is without zero divisors, which is more involved than the case where R is an integral domain. We have to use a constructive deciphering technique that replaces the use of minimal primes (in classical mathematics) by suitable explicit localizations in a suitable tree.
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