On escaping sets of some families of entire functions and dynamics of composite entire functions
Abstract
We consider two families of functions F=\f,(z)= e-z++: ,\,∈, <0, ≥ 1\ and F'=\fμ,(z)= ez+μ+: μ,\,∈, μ<0, ≤-1\ and investigate the escaping sets of members of the family F and F'. We also consider the dynamics of composite entire functions and provide conditions for equality of escaping sets of two transcendental entire functions.
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