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Mikhail Bondarko
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I am interested in $P$ that is smooth and proper over a field and such that the derived category of coherent sheaves $D^b(P)$ possesses a $t$-structure whose heart is the category of finitely generated left $R'$-modules for some (non-commutative) ringleft noetherian ring $R'$.

Which examples are known? Do all of them support full exceptional collections (see https://en.wikipedia.org/wiki/Semiorthogonal_decomposition#Exceptional_collection)?

More generally, which examples of this sort are known if $P$ is a regular scheme that is proper over the spectrum of a (commutative) noetherian ring?

This question is close to Bounded derived categories of which smooth projectives possess bounded t-structures whose hearts have enough injectives?

I am interested in $P$ that is smooth and proper over a field and such that the derived category of coherent sheaves $D^b(P)$ possesses a $t$-structure whose heart is the category of $R'$-modules for some (non-commutative) ring $R'$.

Which examples are known? Do all of them support full exceptional collections (see https://en.wikipedia.org/wiki/Semiorthogonal_decomposition#Exceptional_collection)?

This question is close to Bounded derived categories of which smooth projectives possess bounded t-structures whose hearts have enough injectives?

I am interested in $P$ that is smooth and proper over a field and such that the derived category of coherent sheaves $D^b(P)$ possesses a $t$-structure whose heart is the category of finitely generated left $R'$-modules for some left noetherian ring $R'$.

Which examples are known? Do all of them support full exceptional collections (see https://en.wikipedia.org/wiki/Semiorthogonal_decomposition#Exceptional_collection)?

More generally, which examples of this sort are known if $P$ is a regular scheme that is proper over the spectrum of a (commutative) noetherian ring?

This question is close to Bounded derived categories of which smooth projectives possess bounded t-structures whose hearts have enough injectives?

Source Link
Mikhail Bondarko
  • 16.9k
  • 4
  • 34
  • 97

Bounded derived categories of which smooth projectives possess bounded t-structures whose hearts are categories of modules?

I am interested in $P$ that is smooth and proper over a field and such that the derived category of coherent sheaves $D^b(P)$ possesses a $t$-structure whose heart is the category of $R'$-modules for some (non-commutative) ring $R'$.

Which examples are known? Do all of them support full exceptional collections (see https://en.wikipedia.org/wiki/Semiorthogonal_decomposition#Exceptional_collection)?

This question is close to Bounded derived categories of which smooth projectives possess bounded t-structures whose hearts have enough injectives?