Quasi-isometric embedding of the fundamental group of an orthogonal graph-manifold into a product of metric trees
Abstract
In every dimension n 3 we introduce a class of orthogonal graph-manifolds and prove that the fundamental group of any orthogonal graph-manifold quasi-isometrically embeds into a product of n trees. As a consequence, we obtain that asymptotic and linearly-controlled asymptotic dimensions of such group are equal to n.
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