On the conditions for the continuity of the Hausdorff measure

Abstract

Let (bk)k = 0∞ be strictly decreasing sequence of real numbers such that b0 = 1 and \fk:[bk,bk-1] [0,1]\k∈ be decreasing functions such that fk(bk) = 1 and fk(bk-1) = 0, k = 1, 2, …. By gk: [0,1] [bk, bk-1] we denote the inverse of fk for k = 1,2 …. First, we define iterated function system (IFS) Sn by limiting the collection of functions gk to first n, meaning Sn = \gk \\k=1, … n\. Let Jn denote the limit set of Sn. In the first part, we show that if Sn fulfills the following two conditions: (1)~n ∞ (1-hn) n = 0 where hn is the Hausdorff dimension of Jn, and (2)~ k∈ N \bk-bk+1bk+1 \ < ∞ , then n ∞ Hhn(Jn) = 1 = H1(J), where hn is the Hausdorff dimension of Jn and Hhn is the corresponding Hausdorff measure. In the second part, we provide four conditions for IFS consisting of nonlinear functions fk which guarantee that n ∞ Hhn(Jn) = 1 = H1(J), where hn is the Hausdorff dimension of Jn and Hhn is the corresponding Hausdorff measure. We also provide a wide collection of examples of families of IFSes fulfilling those assumptions.

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