Infinite systolic groups are not torsion
Abstract
We study k-systolic complexes introduced by T. Januszkiewicz and J. \'Swiatkowski, which are simply connected simplicial complexes of simplicial nonpositive curvature. Using techniques of filling diagrams we prove that for k ≥ 7 the 1-skeleton of a k-systolic complex is Gromov hyperbolic. We give an elementary proof of the so-called Projection Lemma, which implies contractibility of 6-systolic complexes. We also present a new proof of the fact that an infinite group acting geometrically on a 6-systolic complex is not torsion.
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