Maximal Chains of Prime Ideals of Different Lengths in Unique Factorization Domains
Abstract
We show that, given integers n1,n2, … ,nk with 2 < n1 < n2 < ·s < nk, there exists a local (Noetherian) unique factorization domain that has maximal chains of prime ideals of lengths n1, n2, … ,nk which are disjoint except at their minimal and maximal elements. In addition, we demonstrate that unique factorization domains can have other unusual prime ideal structures.
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