Edge subdivisions and the L2-homology of right-angled Coxeter groups
Abstract
If L is a flag triangulation of Sn-1, then the Davis complex L for the associated right-angled Coxeter group WL is a contractible n-manifold. A special case of a conjecture of Singer predicts that the L2-homology of such L vanishes outside the middle dimension. We give conditions which guarantee this vanishing is preserved under edge subdivision of L. In particular, we verify Singer's conjecture when L is the barycentric subdivision of the boundary of an n-simplex, and for general barycentric subdivisions of triangulations of S2n-1. Using this, we construct explicit counterexamples to a torsion growth analogue of Singer's conjecture.
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