Branched covers and matrix factorizations
Abstract
Let (S, n) be a regular local ring and f a non-zero element of n2. A theorem due to Kn\"orrer states that there are finitely many isomorphism classes of maximal Cohen-Macaulay R=S/(f)-modules if and only if the same is true for the double branched cover of R, that is, the hypersurface ring defined by f+z2 in S[[ z ]]. We consider an analogue of this statement in the case of the hypersurface ring defined instead by f+zd for d 2. In particular, we show that this hypersurface, which we refer to as the d-fold branched cover of R, has finite Cohen-Macaulay representation type if and only if, up to isomorphism, there are only finitely many indecomposable matrix factorizations of f with d factors. As a result, we give a complete list of polynomials f with this property in characteristic zero. Furthermore, we show that reduced d-fold matrix factorizations of f correspond to Ulrich modules over the d-fold branched cover of R.
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