Non-amenable finitely presented torsion-by-cyclic groups
classification
🧮 math.GR
math.FA
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groupfinitelypresentednon-amenableconstructcounterexamplecyclicexponent
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We construct a finitely presented non-amenable group without free non-cyclic subgroups thus providing a finitely presented counterexample to von Neumann's problem. Our group is an extension of a group of finite exponent n >> 1 by a cyclic group, so it satisfies the identity [x,y]^n = 1.
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