Derived categories of skew quadric hypersurfaces

Abstract

The existence of a full strong exceptional sequence in the derived category of a smooth quadric hypersurface was proved by Kapranov. In this paper, we present a skew generalization of this result. Namely, we show that if S is a standard graded ( 1)-skew polynomial algebra in n variables with n ≥ 3 and f = x12+·s +xn2 ∈ S, then the derived category Db(qgr S/(f)) of the noncommutative scheme qgr S/(f) has a full strong exceptional sequence. The length of this sequence is given by n-2+2r where r is the nullity of a certain matrix over F2. As an application, by studying the endomorphism algebra of this sequence, we obtain the classification of Db(qgr S/(f)) for n=3, 4.