On the Infinitude of Prime Ideals in Dedekind Domains
Abstract
Let R be an infinite Dedekind domain with at most finitely many units, and let K denote its field of fractions. We prove the following statement. If L/K is a finite Galois extension of fields and O is the integral closure of R in L, then O contains infinitely many prime ideals. In particular, if O is further a unique factorization domain, then O contains infinitely many non-associate prime elements.
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