Kernels for Grassmann flops

Matthew R. Ballard; Nitin K. Chidambaram; David Favero; Patrick K. McFaddin; Robert R. Vandermolen

doi:10.1016/j.matpur.2021.01.005

Kernels for Grassmann flops

Matthew R. Ballard, Nitin K. Chidambaram, David Favero, Patrick K. McFaddin, Robert R. Vandermolen

Research output: Contribution to journal › Article › peer-review

3 Scopus citations

Abstract

We develop a generalization of the Q-construction of the first author, Diemer, and the third author for Grassmann flips. This generalization provides a canonical idempotent kernel on the derived category of the associated global quotient stack. The idempotent kernel, after restriction, induces a semi-orthogonal decomposition which compares the flipped varieties. Furthermore its image, after restriction to the geometric invariant theory semistable locus, “opens” a canonical “window” in the derived category of the quotient stack. We check this window coincides with the set of representations used by Kapranov to form a full exceptional collection on Grassmannians.

Original language	English (US)
Pages (from-to)	29-59
Number of pages	31
Journal	Journal des Mathematiques Pures et Appliquees
Volume	147
DOIs	https://doi.org/10.1016/j.matpur.2021.01.005
State	Published - Mar 2021
Externally published	Yes

Bibliographical note

Publisher Copyright:
© 2021 Elsevier Masson SAS

Keywords

Birational geometry
Derived categories
Representation theory

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10.1016/j.matpur.2021.01.005

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abstract = "We develop a generalization of the Q-construction of the first author, Diemer, and the third author for Grassmann flips. This generalization provides a canonical idempotent kernel on the derived category of the associated global quotient stack. The idempotent kernel, after restriction, induces a semi-orthogonal decomposition which compares the flipped varieties. Furthermore its image, after restriction to the geometric invariant theory semistable locus, “opens” a canonical “window” in the derived category of the quotient stack. We check this window coincides with the set of representations used by Kapranov to form a full exceptional collection on Grassmannians.",

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AU - Ballard, Matthew R.

AU - Chidambaram, Nitin K.

AU - Favero, David

AU - McFaddin, Patrick K.

AU - Vandermolen, Robert R.

PY - 2021/3

Y1 - 2021/3

N2 - We develop a generalization of the Q-construction of the first author, Diemer, and the third author for Grassmann flips. This generalization provides a canonical idempotent kernel on the derived category of the associated global quotient stack. The idempotent kernel, after restriction, induces a semi-orthogonal decomposition which compares the flipped varieties. Furthermore its image, after restriction to the geometric invariant theory semistable locus, “opens” a canonical “window” in the derived category of the quotient stack. We check this window coincides with the set of representations used by Kapranov to form a full exceptional collection on Grassmannians.

AB - We develop a generalization of the Q-construction of the first author, Diemer, and the third author for Grassmann flips. This generalization provides a canonical idempotent kernel on the derived category of the associated global quotient stack. The idempotent kernel, after restriction, induces a semi-orthogonal decomposition which compares the flipped varieties. Furthermore its image, after restriction to the geometric invariant theory semistable locus, “opens” a canonical “window” in the derived category of the quotient stack. We check this window coincides with the set of representations used by Kapranov to form a full exceptional collection on Grassmannians.

KW - Birational geometry

KW - Derived categories

KW - Representation theory

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ER -

Kernels for Grassmann flops

Abstract

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Keywords

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