Packing dimensions of the divergence points of self-similar measures with the open set condition

Abstract

Let μ be the self-similar measure supported on the self-similar set K with open set condition. In this article, we discuss the packing dimension of the set \x∈ K: A(μ(B(x,r)) r)=I\ for I⊂eqR, where A(μ(B(x,r)) r) denotes the set of accumulation points of μ(B(x,r)) r as r0$. Our main result solves the conjecture about packing dimension posed by Olsen and Winter OlsWin and generalizes the result in BaeOlsSni.