Cycles of the logistic map
arXiv:1204.0546
Abstract
The onset and bifurcation points of the $n$-cycles of a polynomial map are located through a characteristic equation connecting cyclic polynomials formed by periodic orbit points. The minimal polynomials of the critical parameters of the logistic, Hénon, and cubic maps are obtained for $n$ up to 13, 9, and 8, respectively.
37 pages, 4 figures