Experimental research of iterated dynamics for the complex exponentials with linear term

The research of the orbit of the point zero, fixed points, Julia and Fatou sets for the iterated complex-valued exponential is carried by means of computer experiment. The object of study is three one-parameter families based on exp (iz): f : z → (1 + μ) exp (iz), g : z → (1 + μ|z − z*|) exp (iz), h : z → (1 + μ (z − z*)) exp (iz). Here. For the first family 17- and 2-periodic regimes are detected when passing near the bifurcation value μ ≈ 2.475i, while the multiplicator equals 1. The second family shows a more interesting behavior: (i) three-valley structure of isolines of the convergence rate near fixpoint z* at μ = 0 + 1 + i; (ii) saddle-node transition when the parameter moves along a straight line Reμ = 0, leading to the appearance of a second fixpoint and loss of stability by the old fixpoint at Imμ = 2.1682; (iii) the nontrivial nature of the orbits of points in the vicinity of the new fixpoint and the presence of false fixpoints in the portrait of the Julia set; (iv) second phase transition leading to a radical change in the form of the Julia and Fatou sets at μ ≃ 2.5i. The dynamics of the third family during movement at Reμ = 0 is similar to the first case, but 17th and 2nd periodic modes are replaced by 39th and 3rd modes. Transitions 17 → 2 and 39 → 3 seem to be rapid and discreet while their geometric interpretation matches the ratios 17=1+2*8, 39=13*3. At μ = |z*|⁻¹ for the h- family Julia set fills the entire complex plane.