On the Piecewise Linear Perturbations of the Doubling Map
Abstract
Inspired by the 2007 work by M.~Misiurewicz and A.~Rodrigues [Double Standard Maps, M. Misiurewicz, A. Rodrigues, Communications in Mathematical Physics], we consider a family of circle maps that are perturbations of the doubling map on the circle by a piecewise linear map. We call this the piecewise linear perturbation of the doubling map (PLPDM) and it is given by the formula, fa,b(x)= (2x+a+b2 S(x) ) // 1 for x, a, b ∈ [0,1] , where y // 1 means y 1 (or simply, the fractional part of y) and S(x) is the piecewise linear approximation of 2π(x-1/4). The map S(x) is called the straight sine map. Define the hyperbolic set, H= \ (a,b) ∈ R/Z × [0,1] : fa,b has an attracting cycle \. Tongues are defined as the components of H that touch the ceiling \b=1\ in a non degenerate interval. Any other component is referred to as an Eye. We show the uniqueness of the attracting cycle of fa,b for (a,b) ∈ H. We then define type and prove the existence of the tongues of all types. We also show how combinatorics of the attracting orbit determines if the component is a tongue or an eye. We show that fa,b is conjugate to the doubling map if (a,b) H. Some experimental proof of the existence of eyes in the parameter space corresponding to different combinatorics will be shown.
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