Soficity, short cycles and the Higman group
Abstract
This is a paper with two aims. First, we show that the map from Z/pZ to itself defined by exponentiation x mx has few 3-cycles -- that is to say, the number of cycles of length three is o(p). This improves on previous bounds. Our second objective is to contribute to an ongoing discussion on how to find a non-sofic group. In particular, we show that, if the Higman group were sofic, there would be a map from Z/pZ to itself, locally like an exponential map, yet satisfying a recurrence property.
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