Brück, Benjamin: Between buildings and free factor complexes. 2020
Inhalt
- Introduction
- Preliminaries on (poset) topology
- Posets and their realisations
- Tools from poset topology
- The nerve of a covering
- Spherical complexes
- The Cohen–Macaulay property
- Coset complexes
- Definitions and basic properties
- Higher generation and Cohen–Macaulay complexes
- Parabolic subgroups and buildings
- Levi subgroups and the opposition complex
- Characterisation of CM coset complexes
- Coset complexes and short exact sequences
- Homotopy type of the complex of free factors
- Preliminaries: Free products and their automorphisms
- Free factors and free splittings
- Relative automorphism groups
- Relative Outer space
- The case A=Fn: Culler–Vogtmann Outer space
- Complexes of free factors
- Posets of graphs
- Contractibility of relative free splitting complexes
- Outline of the proof
- Subgraphs of groups
- Blow-up construction
- Proof of lem blow-up construction
- Contractibility of X(A0, …, Al : B0, …, Bm)
- Proof of contractibility of free splitting complexes
- Factor complexes at infinity
- Higher connectivity of factor complexes
- Projection to the second factor
- Projection to the first factor
- Homotopy type of F
- Higher connectivity of FF
- Boundary structures of Outer space
- A Cohen–Macaulay complex for Out(RAAGs)
- Relative automorphism groups of RAAGs
- RAAGs and their automorphism groups
- Generators of relative automorphism groups
- Restriction and projection homomorphisms
- Restrictions to conical subgroups
- A spherical complex for Out(A)
- Summary of the inductive procedure and examples
- Cohen–Macaulayness, higher generation and rank
- Cohen–Macaulayness
- Parabolic subgroups of lower rank
- Interpretation of rank in terms of Coxeter groups
- Closing comments and open questions
- Appendix: Graph posets