Metrical Diophantine analysis for tame parabolic iterated function systems (Q1764377)

The authors consider a very interesting and modern subject of finite parabolic iterated functions (IFs). It is defined the class of tame IFs which satisfy the super strong open set condition. The first main result is the derivation of a formula which describes in a uniform way the scaling of the conformal measure associated with a tame IF at arbitrary points in the associated limit set. The second goal is to provide a metrical Diophantine analysis for these parabolic limit sets in the spirit of some theorems in number theory. Subsequently, it is shown that these laws provide some efficient control of the fluctuations of the \(h\)-conformal measure (\(h\) being the Hausdorff dimension of the limit set associated to such a system), giving rise refinements of the description of the \(h\)-conformal measure in terms of Hausdorff and packing measures with respect to some gauge functions. The paper is very well and rigorous written.