Almost a building for the tame automorphism group
From MaRDI portal
Publication:2077168
DOI10.5802/ahl.83OpenAlexW3198513249MaRDI QIDQ2077168
Stéphane Lamy, Piotr Przytycki
Publication date: 24 February 2022
Published in: Annales Henri Lebesgue (Search for Journal in Brave)
Full work available at URL: https://arxiv.org/abs/1802.00481
Buildings and the geometry of diagrams (51E24) Affine spaces (automorphisms, embeddings, exotic structures, cancellation problem) (14R10) Hyperbolic groups and nonpositively curved groups (20F67) Groups with a (BN)-pair; buildings (20E42) Representation theory of groups (20Cxx) Special varieties (14Mxx)
Related Items
Tits-type alternative for certain groups acting on algebraic surfaces ⋮ Torsion groups do not act on 2-dimensional \(\text{CAT}(0)\) complexes ⋮ Tits Alternative for -dimensional complexes ⋮ Spectral interpretations of dynamical degrees and applications ⋮ Morse quasiflats. II ⋮ Degree growth for tame automorphisms of an affine quadric threefold
Cites Work
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Stable tameness of two-dimensional polynomial automorphisms over a regular ring
- The tame automorphism group of an affine quadric threefold acting on a square complex
- Valuations and plurisubharmonic singularities
- Kac-Moody groups, hovels and Littelmann paths
- A geometric proof of a theorem of Jung
- Fixed point free actions on \(\mathbb{Z}\)-acyclic 2-complexes.
- The generalized amalgamated product structure of the tame automorphism group in dimension three
- Buildings
- Eigenvaluations
- Schémas en groupes et immeubles des groupes classiques sur un corps local. II : groupes unitaires
- ON THE STRUCTURE OF THE SPECIAL LINEAR GROUP OVER POLYNOMIAL RINGS
- Acylindrical hyperbolicity of the three-dimensional tame automorphism group
- Hyperbolically embedded subgroups and rotating families in groups acting on hyperbolic spaces
- Combinatorics of the tame automorphism group
- Metric spaces, convexity and nonpositive curvature
- A nonlinearizable action of \(S_3\) on \(\mathbb{C}^4\)
