Oberwolfach Surgery Seminar 2012: General information
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=== Algebraic surgery versus geometric surgery === | === Algebraic surgery versus geometric surgery === | ||
| − | #[[Oberwolfach Surgery Seminar 2012: Program#The algebraic surgery exact sequence|The algebraic surgery exact sequence]] [[User: | + | #[[Oberwolfach Surgery Seminar 2012: Program#The algebraic surgery exact sequence|The algebraic surgery exact sequence]] [[User:Ranicki|AR]] |
#[[Oberwolfach Surgery Seminar 2012: Program#The topological block bundle obstruction|The topological block bundle obstruction]] [[User:Tibor Macko|TM]] | #[[Oberwolfach Surgery Seminar 2012: Program#The topological block bundle obstruction|The topological block bundle obstruction]] [[User:Tibor Macko|TM]] | ||
| − | #[[Oberwolfach Surgery Seminar 2012: Program#The surgery obstruction|The surgery obstruction]] [[User: | + | #[[Oberwolfach Surgery Seminar 2012: Program#The surgery obstruction|The surgery obstruction]] [[User:Tibor Macko|TM]] |
#[[Oberwolfach Surgery Seminar 2012: Program#The geometric and algebraic surgery exact sequences|The geometric and algebraic surgery exact sequences]] [[User:Ranicki|AR]] | #[[Oberwolfach Surgery Seminar 2012: Program#The geometric and algebraic surgery exact sequences|The geometric and algebraic surgery exact sequences]] [[User:Ranicki|AR]] | ||
#[[Oberwolfach Surgery Seminar 2012: Program#Examples and related developments|Examples and related developments]] [[User:Ranicki|AR]] | #[[Oberwolfach Surgery Seminar 2012: Program#Examples and related developments|Examples and related developments]] [[User:Ranicki|AR]] | ||
Revision as of 17:27, 2 May 2012
Contents |
1 Prerequisites
The prerequisites for the seminar are a solid knowledge of the basics of differential and algebraic topology, meaning: manifolds, Poincaré duality, bundles, cobordism, transversality, generalized homology and cohomology, homotopy groups.
Participants should be familiar with the ideas covered in the first 7 chapters of the book [Ranicki2002]. However material from sections 2.2., 4.2, 5.4, 7.3 will be covered during the seminar. In addition participants should be familiar with the basics of spectra in stable homotopy theory. A good reference here is [Hatcher2002, Section 4.F].
The main references for the material covered in the seminar are [Ranicki1979], [Ranicki1992], [Kühl&Macko&Mole2011] and [Wall1999].
2 Schedule
2.1 Geometric surgery
- Bundle theories DC
- Spivak normal fibration DC
- Normal invariants and surgery below the middle dimension DC
- L-groups of rings with involution DC
- Surgery obstructions DC
- The geometric surgery exact sequence DC
- The TOP surgery exact sequence TM
2.2 Algebraic surgery
- Structured chain complexes AR
- Symmetric and quadratic signature AR
- Algebraic surgery and L-groups via chain complexes AR
- Examples of Poincaré complexes Speakers TBA
- Algebraic bordism categories and categories over complexes TM
- Generalized homology theories TM
- The normal complexes TM
2.3 Algebraic surgery versus geometric surgery
- The algebraic surgery exact sequence AR
- The topological block bundle obstruction TM
- The surgery obstruction TM
- The geometric and algebraic surgery exact sequences AR
- Examples and related developments AR
