The stable category of graded MCM modules over S ⋉ S_σ(-1) is triangle equivalent to the bounded derived category of modules over the Koszul dual of the Zhang twist S^{σ^{-1}}.
Vitoria,Equivalences for noncommutative projective spaces, preprint
2 Pith papers cite this work. Polarity classification is still indexing.
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The set of point modules over the universal enveloping algebra of a color Lie algebra is determined and a concrete integer is given making the inverse system of truncated point schemes constant.
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Trivial extensions of Koszul Artin-Schelter regular algebras
The stable category of graded MCM modules over S ⋉ S_σ(-1) is triangle equivalent to the bounded derived category of modules over the Koszul dual of the Zhang twist S^{σ^{-1}}.
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Point modules over the universal enveloping algebras of color Lie algebras
The set of point modules over the universal enveloping algebra of a color Lie algebra is determined and a concrete integer is given making the inverse system of truncated point schemes constant.