We study the dynamics of a family of polynomial functions and the relationship to the dynamics of a related entire transcendental family of functions. As the degree of the polynomial approaches infinity, the polynomial...
We analyze the dynamics of a sequence of families of non-polynomial rational maps, {f a,d }, for a ∈ C* = C \ {0}, d ≥ 2. For each d, {f a,d } is a family of rational maps of degree d of the Riemann sphere parametrized by a ∈...
For more information on the published version, visit American Mathematical Society's (AMS) Website. See also: Furno, Joanna, and Lorelei Koss. Relating Singularly Perturbed Rational Maps to Families of Entire Maps. In...