SS 21
Seminar Topology
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Topic VERDIER SELF-DUAL SHEAVES ON SINGULAR SPACES.
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| Date: | Section (Ref. below): | Status: |
|---|---|---|
| 15.,4,2021 | 2.1 (Homotopy Category of Complexes), 2.2 (Triangulated Categories) | Reserved |
| 22,4,2021 | 2.3 (Triangulation of the Homotopy Category) | Reserved |
| 29,4,2021 | 2.4 up to p. 46 (incl) (Derived Categories) | Reserved |
| 6,5,2021 | p. 47 - end of 2.4.2 (Derived Categories) | Reserved |
| 20,5,2021 | 2.4.3 (Derived Functors) | Reserved |
| 27,5,2021 | 3.1 , 3.2 (direct/inverse image with proper support) | Reserved |
| 10,6,2021 | 3.3, 3.4, 3.5 (Verdier Duality) | Reserved |
| 17,6,2021 | 4.1.1, 4.1.2 (top. stratifications), Defs. 4.1.25, 4.1.27 (axioms [AX]), 4.2 (Deligne's sheaf) | Reserved |
| 24,6,2021 | 4.4 (Duality thm. on singular spaces), 6.1 (even codimensional strata) | Reserved |
| 1,7,2021 | 6.2 (Whitney stratifications), 6.3 (Goresky-MacPherson L-class) | Reserved |
| 8,7,2021 | 6.4 (Witt spaces), Lemma 8.1.6, 8.2.3 up to top of p. 193 (L-class of a self-dual sheaf) | Reserved |
| 15,7,2021 | 9.1 - 9.1.3 (incl) (Duality on non-Witt spaces) | Reserved |
| 22,7,2021 | 9.1.4 - 9.1.6 (Duality on non-Witt spaces) | Reserved |
Reference: M. Banagl, Topological Invariants of Stratified Spaces, Springer Monographs in Mathematics, Springer-Verlag, 2007.