On a Generalization of the Flag Complex Conjecture of Charney and Davis
Abstract
The Flag Complex Conjecture of Charney and Davis states that for a simplicial complex S which triangulates a (2n - 1)-generalized homology sphere as a flag complex one has (-1)n Σσ ∈ S (-12)σ + 1 0, where the sum runs over all simplices σ of S (including the empty simplex). Interpreting the 1-skeleta of σ∈ S as graphs of Coxeter groups, we present a stronger version of this conjecture, and prove the equivalence of the latter to the Flag Complex Conjecture.
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