Soficity and variations on Higman’s group

Abstract: A group is sofic when every finite subset can be well approximated in a finite symmetric group. No example of a non-sofic group is known. Higman's group, which is a circular amalgamation of four copies of the Baumslag-Solitar group, is a candidate. Here we contribute to the discussion of the problem of its soficity in two ways.We construct variations on Higman's group replacing the Baumslag-Solitar group by other groups G. We give an elementary condition on G, enjoyed for example by Z ≀ Z and the integral Heis… Show more