Topological properties of the immediate basins of attraction for the secant method

Abstract

We study the discrete dynamical system defined on a subset of R2 given by the iterates of the secant method applied to a real polynomial p. Each simple real root α of p has associated its basin of attraction A(α) formed by the set of points converging towards the fixed point (α,α) of S. We denote by A*(α) its immediate basin of attraction, that is, the connected component of A(α) which contains (α,α). We focus on some topological properties of A*(α), when α is an internal real root of p. More precisely, we show the existence of a 4-cycle in ∂ A*(α) and we give conditions on p to guarantee the simple connectivity of A*(α).