Moduli Spaces of Parabolic Connections and Parabolic Bundles and Geometric Langlands by M-H Saito

Moduli Spaces of Parabolic Connections and Parabolic Bundles and Geometric Langlands by M-H Saito

International Centre for Theoretical Sciences via YouTube Direct link

Theorem 4.1.

21 of 26

21 of 26

Theorem 4.1.

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Moduli Spaces of Parabolic Connections and Parabolic Bundles and Geometric Langlands by M-H Saito

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  1. 1 Start
  2. 2 Moduli spaces of parabolic connections and parabolic bundles and Geometric Langland's
  3. 3 1. Moduli spaces of A-parabolic connections 1.1. Settings.
  4. 4 1.2. λ-connections. λ E C.
  5. 5 λ ≠0: linear connection
  6. 6 1.3 Residues and local exponents
  7. 7 1.4. Fuchs relation
  8. 8 1.6. Genericity for local exponents.
  9. 9 1.7. Parabolic connections
  10. 10 1.8. Quasiparabolic bundles.
  11. 11 1.9. Parabolic stability on quasiparbolic bundles.
  12. 12 1.10. a-stable v-parabolic connections.
  13. 13 1.11. Moduli spaces of a- stable parabolic connections and a-stable parabolic Higgs bundles.
  14. 14 1.12. Existence of algebraic moduli space of a-stable v-parabolic con- connections.
  15. 15 1.13. As in the similar way,
  16. 16 1.14. The Moduli space of connections, Painleve VI case.
  17. 17 1.15. The Moduli space of parabolic Higgs bundles.
  18. 18 2. DEFORMATION THEORY AND SYMPLECTIC STRUCTURE
  19. 19 3. Moduli Spaces of Parabolic Bundles
  20. 20 4. The image of v-parabolic connections For simplicity, we propose the following:
  21. 21 Theorem 4.1.
  22. 22 4.1. The coarse moduli for C1 = Pl,
  23. 23 4.2. C = P1 and t = 1. ... .t;.
  24. 24 5. A RESULT OF ARINKS AND LYSENKO
  25. 25 Theorem 5.1 The functor
  26. 26 Q&A

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