Different types of wandering domains in the family λ+z+ z

Abstract

Dynamics of an one-parameter family of functions fλ(z)=λ + z+ z, z ∈ C and λ ∈ C with an unbounded set of singular values is investigated in this article. For |2+λ2|<1, λ=i, 2+λ2=e2π i α for some rational number α and for some bounded type irrational number α, the dynamics of fλ+mπ is determined for m ∈ Z\0\. For such values of λ, the existence of m many wandering domains of fλ+mπ with disjoint grand orbits in the lower half-plane are asserted along with a completely invariant Baker domain containing the upper half-plane. Further, each of such wandering domains is found to be simply connected, unbounded, and escaping. Different types of the internal behavior of \fnλ+mπ\ on such a wandering domain W are highlighted for different values of λ. More precisely, for 2+λ2<1, it is manifested that the forward orbit of any point z∈ W stays away from the boundaries of Wns. For λ=i, it is proved that n→ ∞dist(fni+mπ(z),∂ Wn)=0 for all z∈ W. Further, (fni+mπ(z))→ -∞ as n → ∞. For 2+λ2=e2π iα for some rational number α, n→ ∞dist(fnλ+mπ(z),∂ Wn)=0 is established for all z∈ W. But, (fnλ+mπ(z)) tends to a finite point for all z∈ W whenever n → ∞. For 2+λ2=e2π iα, n→ ∞dist(fnλ+mπ(z),∂ Wn)>0 for all z∈ W and dist(fnλ+mπ(z),fnλ+mπ(z')=dist(z,z') is authenticated for all z,z'∈ W and for some bounded type irrational number α.