Existence of irreducible \(\mathbb R\)-regular elements in Zariski-dense subgroups
From MaRDI portal
Publication:1565802
DOI10.4310/MRL.2003.v10.n1.a3zbMath1029.22020MaRDI QIDQ1565802
Andrei S. Rapinchuk, Gopal Prasad
Publication date: 13 October 2003
Published in: Mathematical Research Letters (Search for Journal in Brave)
Linear algebraic groups over arbitrary fields (20G15) Semisimple Lie groups and their representations (22E46) General properties and structure of real Lie groups (22E15)
Related Items
Closed geodesics and holonomies for Kleinian manifolds ⋮ On the splitting fields of generic elements in Zariski dense subgroups ⋮ Geodesic planes in hyperbolic 3-manifolds ⋮ On Hilbert’s irreducibility theorem for linear algebraic groups ⋮ Global smooth and topological rigidity of hyperbolic lattice actions ⋮ Generic elements of a Zariski-dense subgroup form an open subset ⋮ Rigidity of Kleinian groups via self-joinings ⋮ Maximal amenable von Neumann subalgebras arising from maximal amenable subgroups ⋮ Simple algebraic groups with the same maximal tori, weakly commensurable Zariski-dense subgroups, and good reduction ⋮ The linear part of an affine group acting properly discontinuously and leaving a quadratic form invariant ⋮ On the fields generated by the lengths of closed geodesics in locally symmetric spaces ⋮ On groups and semigroups of matrices with spectra in a finitely generated field ⋮ The central limit theorem for eigenvalues ⋮ Smooth factors of projective actions of higher-rank lattices and rigidity ⋮ Malnormal subgroups of lattices and the Pukánszky invariant in group factors ⋮ On division algebras having the same maximal subfields. ⋮ Actions of large semigroups and random walks on isometric extensions of boundaries ⋮ Convexes divisibles III ⋮ Weakly commensurable arithmetic groups and isospectral locally symmetric spaces ⋮ Fat Flats in rank one manifolds ⋮ Non-virtually abelian anisotropic linear groups are not boundedly generated ⋮ Spinor groups with good reduction ⋮ Bounded generation by semi-simple elements: quantitative results ⋮ The Auslander conjecture for groups leaving a form of signature \((n-2,2)\) invariant.
