Fundamental groups of non-compact arithmetic hyperbolic n-manifolds (n≥4) contain thin surface subgroups; doubles of cusped ones embed as GFERF subgroups of SO^+(n+1,1).
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Establishes Strong Atiyah Conjecture for finite-index torsion-free subgroups of Out(G) when G is a surface group, free group or RAAG, implying discrete von Neumann dimensions and Zero Divisor Conjecture for the group algebras.
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Thin surface subgroups of non-uniform arithmetic lattices in $\rm{SO}^+(n,1)$
Fundamental groups of non-compact arithmetic hyperbolic n-manifolds (n≥4) contain thin surface subgroups; doubles of cusped ones embed as GFERF subgroups of SO^+(n+1,1).
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Outer automorphism groups and the Atiyah Conjecture
Establishes Strong Atiyah Conjecture for finite-index torsion-free subgroups of Out(G) when G is a surface group, free group or RAAG, implying discrete von Neumann dimensions and Zero Divisor Conjecture for the group algebras.