A piecewise contractive dynamical system and election methods

We prove some basic results for a dynamical system given by a piecewise linear and contractive map on the unit interval that takes two possible values at a point of discontinuity. We prove that there exists a universal limit cycle in the non-exceptional cases, and that the exceptional parameter set is very tiny in terms of gauge functions. The exceptional two-dimensional parameter is shown to have Hausdorff-dimension one. We also study the invariant sets and the limit sets; these are sometimes different and there are several cases to consider. In addition, we give a thorough investigation of the dynamics; studying the cases of rational and irrational rotation numbers separately, and we show the existence of a unique invariant measure. We apply some of our results to a combinatorial problem involving an election method suggested by Phragm\'en and show that the proportion of elected seats for each party converges to a limit, which is a rational number except for a very small exceptional set of parameters. This is in contrast to a related election method suggested by Thiele, which we study at the end of this paper, for which the limit can be irrational also in typical cases and hence there is no typical ultimate periodicity as in the case of Phragm\'en's method.