On the ubiquity of uniformly dominant local rings
Abstract
Let R be a d-dimensional Cohen-Macaulay complete local ring with infinite residue field k. The dominant index dx(R) is by definition the least number of extensions necessary to build k in the singularity category Dsg out of each nonzero object, up to finite direct sums, direct summands and shifts. The local ring R is called uniformly dominant if dx(R) is finite. In this paper, we prove that R is uniformly dominant with dx(R)6d+5 if R has codimension 2 and is not a complete intersection. Also, we show that R is uniformly dominant with dx(R) d+1 if R is Burch, and with dx(R) d if R is either a quasi-fiber product ring, or has multiplicity at most 5 and is not Gorenstein. A result on hypersurfaces by Ballard, Favero and Katzarkov is recovered, and results on Burch rings and quasi-fiber product rings by Takahashi are refined.
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