Clifford deformations of Koszul Frobenius algebras and noncommutative quadrics

Abstract

Let E be a Koszul Frobenius algebra. A Clifford deformation of E is a finite dimensional Z2-graded algebra E(θ), which corresponds to a noncommutative quadric hypersurface E!/(z), for some central regular element z∈ E!2. It turns out that the bounded derived category Db(gr Z2E(θ)) is equivalent to the stable category of the maximal Cohen-Macaulay modules over E!/(z) provided that E! is noetherian. As a consequence, E!/(z) is a noncommutative isolated singularity if and only if the corresponding Clifford deformation E(θ) is a semisimple Z2-graded algebra. The preceding equivalence of triangulated categories also indicates that Clifford deformations of trivial extensions of a Koszul Frobenius algebra are related to the Kn\"orrer Periodicity Theorem for quadric hypersurfaces. As an application, we recover Kn\"orrer Periodicity Theorem without using of matrix factorizations.