On dynamics of the Chebyshev's method for quartic polynomials
Abstract
Let be a normalized (monic and centered) quartic polynomial with non-trivial symmetry groups. It is already known that if is unicritical, with only two distinct roots with the same multiplicity or having a root at the origin then the Julia set of its Chebyshev's method is connected and symmetry groups of and coincide~[Nayak, T., and Pal, S., Symmetry and dynamics of Chebyshev's method, \cite{Sym-and-dyn}]. Every other quartic polynomial is shown to be of the form where . Some dynamical aspects of the Chebyshev's method of are investigated in this article for all real . It is proved that all the extraneous fixed points of are repelling which gives that there is no invariant Siegel disk for . It is also shown that there is no Herman ring in the Fatou set of . For positive , it is proved that at least two immediate basins of corresponding to the roots of are unbounded and simply connected. For negative , it is however proved that all the four immediate basins of corresponding to the roots of are unbounded and those corresponding to are simply connected.
Keywords
Cite
@article{arxiv.2309.07562,
title = {On dynamics of the Chebyshev's method for quartic polynomials},
author = {Tarakanta Nayak and Soumen Pal},
journal= {arXiv preprint arXiv:2309.07562},
year = {2023}
}
Comments
26 pages, 8 figures