A note on even Clifford algebras of skew quadric hypersurfaces

Abstract

Let Sα = k x1,…,xn /(xi xj - αij xj xi) be a standard graded skew polynomial algebra over an algebraically closed field k of characteristic not equal to 2. We show the following results. When n is odd and f = x1x2 + ·s + xn-2xn-1 + xn2 is a normal element of Sα, the even Clifford algebra of the skew quadric hypersurface Sα/(f) is isomorphic to a full matrix algebra M2(n-1)/2(k), and the stable category CM Z(Sα/(f)) of graded maximal Cohen-Macaulay modules over Sα/(f) is triangle equivalent to the derived category Db(mod\,k). When n is even and f = x1x2 + ·s + xn-1xn is a normal element of Sα, the even Clifford algebra of Sα/(f) is isomorphic to M2(n-2)/2(k)2, and the stable category CM Z(Sα/(f)) of graded maximal Cohen-Macaulay modules over Sα/(f) is triangle equivalent to the derived category Db(mod\,k2). As a consequence, Sα/(f) is of finite Cohen-Macaulay representation type in both cases. These results demonstrate that Sα/(f) is a natural noncommutative generalization of the homogeneous coordinate ring of a smooth quadric hypersurface.