Derived equivalences of generalized Kummer varieties
In this article we study derived (auto)equivalences of generalized Kummer varieties $\mathrm{Kum}^n(A)$. We provide an answer to a question raised by Namikawa by showing that the generalized Kummer varieties $\mathrm{Kum}^n(A)$ and $\mathrm{Kum}^n(A^\vee)$ are derived equivalent as long as $n$ is ev...
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| Sprache: | eng |
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| Zusammenfassung: | In this article we study derived (auto)equivalences of generalized Kummer
varieties $\mathrm{Kum}^n(A)$. We provide an answer to a question raised by
Namikawa by showing that the generalized Kummer varieties $\mathrm{Kum}^n(A)$
and $\mathrm{Kum}^n(A^\vee)$ are derived equivalent as long as $n$ is even and
the abelian surface $A$ admits a polarization whose exponent is coprime to
$n+1$. Furthermore we obtain exact sequences involving groups of
autoequivalences in the style of Orlov's short exact sequence for
autoequivalences of abelian varieties. |
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| DOI: | 10.48550/arxiv.2208.11183 |