Critical points of the multiplier map for the quadratic family
Abstract
The multiplier λn of a periodic orbit of period n can be viewed as a (multiple-valued) algebraic function on the space of all complex quadratic polynomials pc(z)=z2+c. We provide a numerical algorithm for computing critical points of this function (i.e., points where the derivative of the multiplier with respect to the complex parameter c vanishes). We use this algorithm to compute critical points of λn up to period n=10.
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