Constructing Noncatenary Quasi-Excellent Precompletions
Abstract
Let T be a local (Noetherian) ring and let Q1 and Q2 be prime ideals of T. We find sufficient conditions for there to exist a quasi-excellent local subring B of T satisfying the following conditions: (1) the completion of B at its maximal ideal is isomorphic to the completion of T at its maximal ideal, (2) B Q1 = B Q2, (3) the set of prime ideals of T/(Q1 Q2) of positive height is the same as the set of prime ideals of B/(B Q1) of positive height when viewed as partially ordered sets, and (4) for i = 1 and for i = 2, there is a coheight preserving bijection between the minimal prime ideals of TQi and the minimal prime ideals of BB Q1. Intuitively, this means that T contains a quasi-excellent local subring in which Q1 and Q2 are "glued together" and such that both the completion and desirable properties of the prime spectrum are preserved. We use this result to show that certain complete local rings are the completion of a quasi-excellent local ring whose prime spectrum, when viewed as a partially ordered set, contains interesting noncatenary finite subsets.
Turn this paper into a full lesson
ArcXiv compiles a staged curriculum from this paper: 8-12 lessons across beginner → advanced, synthesised section guides, visuals, flashcards, a quiz, exercises, and on-demand deep dives per section. Grounded in the abstract, never invented.