Variations of Hausdorff Dimension in the Exponential Family

Abstract

In this paper we deal with the following family of exponential maps (fλ:z λ(ez-1))λ∈ [1,+∞). Denoting d(λ) the hyperbolic dimension of fλ. It is known that the function λ d(λ) is real analytic in (1,+∞), and that it is continuous in [1,+∞). In this paper we prove that this map is C1 on [1,+∞), with d'(1+)=0. Moreover, depending on the value of d(1), we give estimates of the speed of convergence towards 0.