Universidad Complutense de Madrid
E-Prints Complutense

Rate of convergence: the packing and centered Hausdorff measures of totally disconnected self-similar sets



Downloads per month over past year

LLorente Comí, Marta and Mera Rivas, María Eugenia and Morán Cabré, Manuel (2017) Rate of convergence: the packing and centered Hausdorff measures of totally disconnected self-similar sets. Chaos, Solitons and Fractals, 98 . pp. 220-232. ISSN 0960-0779


Official URL: http://dx.doi.org/10.1016/j.chaos.2017.03.007


In this paper we obtain the rates of convergence of the algorithms given in [13] and [14] for an automatic computation of the centered Hausdorff and packing measures of a totally disconnected self-similar set. We evaluate these rates empirically through the numerical analysis of three standard classes of selfsimilar sets, namely, the families of Cantor type sets in the real line and the plane and the class of Sierpinski gaskets. For these three classes and for small contraction ratios, sharp bounds for the exact values of the corresponding measures are obtained and it is shown how these bounds automatically yield estimates of the corresponding measures, accurate in some cases to as many as 14 decimal places. In particular, the algorithms accurately recover the exact values of the measures in all cases in which these values are known by geometrical arguments. Positive results, which confirm some conjectural values given in [13] and [14] for the measures, are also obtained for an intermediate range of larger contraction ratios. We give an argument showing that, for this range of contraction ratios, the problem is inherently computational in the sense that any theoretical proof, such as those mentioned above, might be impossible, so that in these cases, our method is the only available approach. For contraction ratios close to those of the connected case our computational method becomes intractably time consuming, so the computation of the exact values of the packing and centered Hausdorff measures in the general case, with the open set condition, remains a challenging problem.

Item Type:Article
Uncontrolled Keywords:Packing measure; Centered Hausdorff measure; Self-similar sets; Computability of fractal measures; Rate of convergence.
Subjects:Sciences > Mathematics
ID Code:57241
Deposited On:07 Oct 2019 11:12
Last Modified:19 Feb 2020 11:36

Origin of downloads

Repository Staff Only: item control page