Logarithmic capacity of random Gδ-sets

Abstract

We study the logarithmic capacity of Gδ subsets of the interval [0,1]. Let S be of the form align* S=m k m Ik, align* where each Ik is an interval in [0,1] with length lk that decrease to 0. We provide sufficient conditions for S to have full capacity, i.e. Cap(S)=Cap([0,1]). We consider the case when the intervals decay exponentially and are placed in [0,1] randomly with respect to some given distribution. The random Gδ sets generated by such distribution satisfy our sufficient conditions almost surely and hence, have full capacity almost surely. This study is motivated by the Gδ set of exceptional energies in the parametric version of the Furstenberg theorem on random matrix products. We also study the family of Gδ sets \S(α)\α>0 that are generated by setting the decreasing speed of the intervals to lk=e-kα. We observe a sharp transition from full capacity to zero capacity by varying α>0.