Matteo Varbaro, Rahim Zaare-Nahandi
Published 2018-06-13Version 1
We show that a Buchsbaum simplicial complex of small codimension must have large depth. More generally, we achieve a similar result for ${\rm CM}_t$ simplicial complexes, a notion generalizing Buchsbaum-ness, and we prove more precise results in the codimension 2 case. Along the paper, we show that the ${\rm CM}_t$ property is a topological invariant of a simplicial complex.
Comments: 9 pages, 1 figure
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Vanishing of cohomology over Gorenstein rings of small codimension
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