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Abstract
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We introduce the notion of right preresolutions (quasiresolutions) for noncommutative
isolated singularities, which is a weaker version of quasiresolutions introduced by Qin, Wang
and Zhang (
J. Algebra 536 (2019), 102–148). We prove that right quasiresolutions for a
noetherian bounded below and locally finite graded algebra with right injective dimension 2
are always Morita equivalent. When we restrict to a noncommutative quadric hypersurface
, we prove
that if
is a noncommutative isolated singularity, then it always admits a right preresolution.
We provide a method to verify whether a noncommutative quadric hypersurface
is an isolated singularity. An example of noncommutative quadric hypersurfaces
with detailed computations of indecomposable maximal Cohen–Macaulay
modules and right preresolutions is included as well.
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Keywords
right preresolution, noncommutative isolated singularity,
noncommutative quadric hypersurface
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Mathematical Subject Classification
Primary: 16E65, 16G50, 16S37
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Milestones
Received: 7 September 2020
Revised: 19 July 2021
Accepted: 21 December 2021
Published: 6 April 2022
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