The quadric flat torus theorem
Abstract
We prove a flat torus theorem for quadric complexes. In particular, we show that if a non-cyclic free abelian group G acts metrically properly on a quadric complex X, then G Z2 and X contains a G-invariant isometric copy of the regular square tiling of the plane. Along the way, we also give a complete proof of the fact that any closed surface subgroup in the fundamental group of a combinatorial 2-complex is represented by a combinatorial map from a cellulation of the surface that is locally injective away from vertices.
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