Symmetry and dynamics of Chebyshev's method

Abstract

The set of all holomorphic Euclidean isometries preserving the Julia set of a rational map R is denoted by R. It is shown in this article that if a root-finding method F satisfies the Scaling theorem, i.e., for a polynomial p, Fp is affine conjugate to Fλ p T for every nonzero complex number λ and every affine map T, then for a centered polynomial p of order at least two (which is not a monomial), p⊂eq Fp. As the Chebyshev's method satisfies the Scaling theorem, we have p ⊂eq Cp, where p is a centered polynomial. The rest part of this article is devoted to explore the situations where the equality holds and in the process, the dynamics of Cp is found. We show that the Julia set J(Cp) of Cp can never be a line. If a centered polynomial p is (a) unicritical, (b) having exactly two roots with the same multiplicity, (c) cubic and p is non-trivial or (d) quartic, 0 is a root of p and p is non-trivial then it is proved that p = Cp. It is found in all these cases that the Fatou set F(Cp) is the union of all the attracting basins of Cp corresponding to the roots of p and J(Cp) is connected. It is observed that J(Cp) is locally connected in all these cases.