Cyclically presented groups with length four positive relators
Abstract
For cyclically presented groups G = Gn(w) with positive length four relators w = x0xjxkxl in the free group with basis x0, x1, …, xn-1, we classify finiteness and, modulo two unresolved cases, we classify asphericity for the underlying presentations. We show that the fixed point subgroup of the shift xi xi+1 is always finite and we relate finiteness of G and asphericity to the dynamics of the shift action by the cyclic group of order n on the nonidentity elements of G.
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