An Orlov theorem for matrix factorizations with multiple factors
Abstract
We prove a generalization of Orlov's theorem for matrix factorizations with n steps. Let X be a regular scheme, W X A1 a flat morphism and D:=W-1(0) its central fiber. We construct an appropriate triangulated category of matrix factorizations with n-steps and show that it is equivalent to the singularity category of the root stack [n](X, D). We also show that this category admits a semiorthogonal decomposition into n-1 copies of the usual (absolute derived) category of matrix factorizations with 2 steps.
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