Irreducible noncommutative quadrics
Abstract
In this paper, we study irreducible noncommutative quadrics S/(f) via noncommutative graded matrix factorizations. We show that the line modules over S/(f) are described by the rulings arising from indecomposable noncommutative linear matrix factorizations of f of rank 2. We study when Zhang twists of a standard smooth irreducible noncommutative quadric are standard. Finally, by identifying all singular central Sklyanin quadrics, we prove that every smooth central Sklyanin quadric is standard.
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