Singular perturbations with multiple poles of the simple polynomials
Abstract
In this article, we study the dynamics of the following family of rational maps with one parameter: equation* fλ(z)= zn+λ2zn-λ, equation* where n≥ 3 and λ∈C*. This family of rational maps can be viewed as a singular perturbations of the simple polynomial Pn(z)=zn. We give a characterization of the topological properties of the Julia sets of the family fλ according to the dynamical behaviors of the orbits of the free critical points.
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