Derived factorization categories of non-Thom--Sebastiani-type sums of potentials

Abstract

We first prove semi-orthogonal decompositions of derived factorization categories arising from sums of potentials of gauged Landau-Ginzburg models, where the sums are not necessarily Thom--Sebastiani type. We then apply the result to the category HMFLf(f) of maximally graded matrix factorizations of an invertible polynomial f of chain type, and explicitly construct a full strong exceptional collection E1,..., Eμ in HMFLf(f) whose length μ is the Milnor number of the Berglund--H\"ubsch transpose f of f. This proves a conjecture, which postulates that for an invertible polynomial f the category HMFLf(f) admits a tilting object, in the case when f is a chain polynomial. Moreover, by careful analysis of morphisms between the exceptional objects Ei, we explicitly determine the quiver with relations (Q,I) which represents the endomorphism ring of the associated tilting object i=1μEi in HMFLf(f), and in particular we obtain an equivalence HMFLf(f) D b( mod\, kQ/I).