A piecewise linear homeomorphism of the circle which is periodic under renormalization
Abstract
We demonstrate the existence of a piecewise linear homeomorphism f of R/Z which maps rationals to rationals, whose slopes are powers of 23, and whose rotation number is 2-1. This is achieved by showing that a renormalization procedure becomes periodic when applied to f. Our construction gives a negative answer to a question of D. Calegari. When combined with work of the 2nd and 3rd authors, our result also shows that F23 does not embed into F, where F23 is the subgroup of the Stein-Thompson group F2,3 consisting of those elements whose slopes are powers of 23. Finally, we produce some evidence suggesting a positive answer to a variation of Calegari's question and record a number of computational observations.
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