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Mutations of noncommutative crepant resolutions: Appendix A. Matrix factorizations

by Eigenvector Initialization PublicationJune 9th, 2024

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This paper studies equivalences between magic windows that correspond to wall-crossings in a hyperplane arrangement in terms of NCCRs.

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Authors:

(1) Wahei Hara;

(2) Yuki Hirano.

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Appendix A. Matrix factorizations

This appendix recalls definitions and fundamental properties of derived factorization categories. See [Pos, BFK1, BDFIK, Hir1, Hir3] for more details.

where W in the left LG model denotes f ∗W by abuse of notation, and the functor (A.A) defines the right derived functor

The following shows an equivariant and factorization version of a tilting equivalence.

Lemma A.6 ([BFK1, Proposition 3.20][1]). Assume that the sections s and t ∗ are regular. Then there are isomorphisms

This paper is available on arxiv under CC0 1.0 DEED license.

[1] There is a typo in the latter assertion in loc. cit.

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science #geometric-invariant-theory #nccrs #iyama-wemyss-mutations #calabi-yau #magic-windows #exchanges-of-modules #quasi-symmetric-representation #wall-crossing

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Mutations of noncommutative crepant resolutions: Appendix A. Matrix factorizations

Eigenvector Initialization Publication

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Too Long; Didn't Read

Eigenvector Initialization Publication

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