Tricomplex dynamical systems generated by polynomials of even degree

Abstract

In this article, we give the exact interval of the cross section of the Multibrot sets generated by the polynomial zp+c where z and c are complex numbers and p ≥ 2 is an even integer. Furthermore, we show that the same Multibrots defined on the hyperbolic numbers are always squares. Moreover, we give a generalized 3D version of the hyperbolic Multibrot set and prove that our generalization is an octahedron for a specific 3D slice of the tricomplex polynomial ηp+c where p ≥ 2 is an even integer.