Abstract
Abstract
Let
$W_{\Gamma} $
be the right-angled Coxeter group with defining graph
$\Gamma $
. We show that the asymptotic dimension of
$W_{\Gamma} $
is smaller than or equal to
$\mathrm{dim}_{CC}(\Gamma )$
, the clique-connected dimension of the graph. We generalize this result to graph products of finite groups.
Publisher
Canadian Mathematical Society