Skew Kn\"orrer's periodicity Theorem

Abstract

In this paper, we introduce a class of twisted matrix algebras of M2(E) and twisted direct products of E× E for an algebra E. Let A be a noetherian Koszul Artin-Schelter regular algebra, z∈ A2 be a regular central element of A and B=AP[y1,y2;σ] be a graded double Ore extension of A. We use the Clifford deformation CA!(z) of Koszul dual A! to study the noncommutative quadric hypersurface B/(z+y12+y22). We prove that the stable category of graded maximal Cohen-Macaulay modules over B/(z+y12+y22) is equivalent to certain bounded derived categories, which involve a twisted matrix algebra of M2(CA!(z)) or a twisted direct product of CA!(z)× CA!(z) depending on the values of P. These results are presented as skew versions of Kn\"orrer's periodicity theorem. Moreover, we show B/(z+y12+y22) may not be a noncommutative graded isolated singularity even if A/(z) is.