Reading Seminar on D-modules (2024S): Difference between revisions

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(Created page with "We meet on Tuesdays on Zoom (email arinkin@math.wisc.edu for the link if you need it). The first meeting is on Tuesday, June 25th. == Tentative schedule == {| cellpadding="8" !align="left" | date !align="left" | speaker !align="left" | title !align="left" | topics |- |June 25 |Josh |Differential operators and filtrations |We'll define the ring of algebraic differential operators together with its order filtration, and discuss some of its implications for modules over...")
 
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|Integral transforms.
|Integral transforms.
|Tensor product. Integral transforms (=Fourier-Mukai functor). The Fourier-Mukai transform on a line.
|Tensor product. Integral transforms (=Fourier-Mukai functor). The Fourier-Mukai transform on a line.
|-}
|}
 
== References ==
 
If you have other suggestions, please let me know!
 
* J.Bernstein's [https://gauss.math.yale.edu/~il282/Bernstein_D_mod.pdf notes] on D-modules. They are quite informal and move very fast.
* R.Hotta, K.Takeuchi, T.Tanisaki, D-modules, perverse sheaves, and representation theory. Very detailed and carefully written book.
* V.Ginzburg's [https://gauss.math.yale.edu/~il282/Ginzburg_D_mod.pdf notes]
* C.Schnell's course on D-modules with lecture-by-lecture notes ([https://www.math.stonybrook.edu/~cschnell/mat615/ Course page]).
* S.C.Coutinho, A primer of algebraic D-modules. The book does go too deep into theory, focusing instead on examples and practical calculation.

Revision as of 19:18, 25 June 2024

We meet on Tuesdays on Zoom (email arinkin@math.wisc.edu for the link if you need it). The first meeting is on Tuesday, June 25th.

Tentative schedule

date speaker title topics
June 25 Josh Differential operators and filtrations We'll define the ring of algebraic differential operators

together with its order filtration, and discuss some of its implications for modules over rings of differential operators.

July 2 available Left and right D-modules. Inverse images. Examples of D-modules on a line. Quasicoherent D-modules. Left vs. right D-modules: an equivalence. Inverse images of D-modules. Examples (open embeddings, smooth morphisms, closed embeddings).
July 9 available

(This is not explained well in references, so only take this if you are comfortable; otherwise I'll do it. Dima.)

Direct images. Derived category of D-modules. `Naive' definition. Definition in the derived category (examples). Time permitting - Kashiwara's Lemma.
July 16 available Integral transforms. Tensor product. Integral transforms (=Fourier-Mukai functor). The Fourier-Mukai transform on a line.

References

If you have other suggestions, please let me know!

  • J.Bernstein's notes on D-modules. They are quite informal and move very fast.
  • R.Hotta, K.Takeuchi, T.Tanisaki, D-modules, perverse sheaves, and representation theory. Very detailed and carefully written book.
  • V.Ginzburg's notes
  • C.Schnell's course on D-modules with lecture-by-lecture notes (Course page).
  • S.C.Coutinho, A primer of algebraic D-modules. The book does go too deep into theory, focusing instead on examples and practical calculation.