Computational Complex Dynamics of fα, β, γ, δ(z)=α z + βγ z2 +δ z

Abstract

The dynamics of the family of maps fα, β, γ, δ(z)=α z + βγ z2 +δ z in complex plane is investigated computationally. This dynamical system zn+1=fα, β, γ, δ(zn)=α zn + βγ zn2 +δ zn has periodic solutions with higher periods which was absent in the real line scenario. It is also found that there are chaotic fractal and non-fractal like solutions of the dynamical systems. A few special cases of parameters are also have been taken care.