Exploding Julia sets in the dynamics of $ f_{\lambda}(z)=\lambda J_{1}(iz)/iz

Abstract

In the present paper, we study the dynamics of the one parameter family of entire functions ff¸(z) = ¸f(z) : f(z) = J1(iz)=iz for z 2 C and ¸ is a non-zero real numberg where J1(z) is the Bessel function of the first kind of order one. We have found a critical parameter ¸¤ ¼ 2:598 and show that the Julia set of f¸ is a nowhere dense subset of the complex plane C for 0 < j¸j · ¸¤ and is equal to extended complex plane bC = C[f1g for j¸j > ¸¤. This sudden change in the Julia sets is known as explosion in the Julia sets or chaotic burst in the dynamics.