MATRIX 2019 Interactions: Exercises
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== Surgery: high-d methods in low-d == | == Surgery: high-d methods in low-d == | ||
− | === Normal maps and the surgery obstruction === | + | === Lecture 1: Normal maps and the surgery obstruction === |
# [[Stability of vector bundles (Ex)]] | # [[Stability of vector bundles (Ex)]] | ||
# [[Normal maps - (non)-examples (Ex)]] | # [[Normal maps - (non)-examples (Ex)]] | ||
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# [[Surgery obstruction, signature (Ex)]] | # [[Surgery obstruction, signature (Ex)]] | ||
# [[Surgery obstruction, Arf-invariant (Ex)]] | # [[Surgery obstruction, Arf-invariant (Ex)]] | ||
+ | === Lecture 2: Foundations of topological 4-manifolds === | ||
+ | === Lecture 3: Stable diffeomorphism and the Q-form conjecture === | ||
+ | === Lecture 4: The surgery machine applied in low dimensions === | ||
+ | === Lecture 5: Topological concordance of classical knows: Where are we?=== | ||
== The (stable) Cannon Conjecture == | == The (stable) Cannon Conjecture == |
Revision as of 14:05, 6 January 2019
This page lists the exercises for consideration during the MATRIX 2019 Interactions meeting.
Participants are encouraged to work on the exercises and contribute solutions on the discussion page.
1 Surgery: high-d methods in low-d
1.1 Lecture 1: Normal maps and the surgery obstruction
- Stability of vector bundles (Ex)
- Normal maps - (non)-examples (Ex)
- Immersing n-spheres in 2n-space (Ex)
- Surgery obstruction, signature (Ex)
- Surgery obstruction, Arf-invariant (Ex)
1.2 Lecture 2: Foundations of topological 4-manifolds
1.3 Lecture 3: Stable diffeomorphism and the Q-form conjecture
1.4 Lecture 4: The surgery machine applied in low dimensions
1.5 Lecture 5: Topological concordance of classical knows: Where are we?
2 The (stable) Cannon Conjecture
2.1 Lecture 1: An introduction to 3-manifolds
- Betti numbers of 3-manifolds (Ex)
- Non-prime solvable fundamental groups (Ex)
- Atoroidal 3-manifolds (Ex)
- Three dimensional Heisenberg group (Ex)
- Circle actions on 3-manifolds (Ex)
2.2 Lecture 2: An introduction to hyperbolic groups
- Torsion-free solvable hyperbolic groups (Ex)
- Fundamental groups of surfaces (Ex)
- Minimal dimension of BG (Ex)
- Extensions of groups (Ex)
- Boundaries of Fuchsian groups (Ex)