Litcius/Paper detail

Absolute profinite rigidity and hyperbolic geometry

Martin R. Bridson, D. B. McReynolds, Alan W. Reid, R. Spitler

2020Annals of Mathematics41 citationsDOI

Abstract

We construct arithmetic Kleinian groups that are profinitely rigid in the absolute sense: each is distinguished from all other finitely generated, residually finite groups by its set of finite quotients. The Bianchi group $\mathrm{PSL}(2,\mathbb{Z}[\omega])$ with $\omega^2+\omega+1 = 0$ is rigid in this sense. Other examples include the non-uniform lattice of minimal co-volume in $\mathrm{PSL}(2,\mathbb{C})$ and the fundamental group of the Weeks manifold (the closed hyperbolic 3-manifold of minimal volume).

Topics & Concepts

MathematicsQuotientPSLRigidity (electromagnetism)OmegaProfinite groupHyperbolic groupPure mathematicsKleinian groupLattice (music)Manifold (fluid mechanics)Hyperbolic manifoldGeometryMathematical analysisCombinatoricsGroup (periodic table)Hyperbolic functionPhysicsEngineeringQuantum mechanicsAcousticsMechanical engineeringGeometric and Algebraic TopologyMathematical Dynamics and FractalsMathematics and Applications
Absolute profinite rigidity and hyperbolic geometry | Litcius