Packing Measure and Dimension of Random Fractals期刊界 All Journals 搜尽天下杂志传播学术成果专业期刊搜索期刊信息化学术搜索

按检索

Packing Measure and Dimension of Random Fractals

Authors:	Artemi Berlinkov R Daniel Mauldin

Institution:	(1) Department of Mathematics, University of North Texas, P.O. Box 311430, Denton, Texas, 76203

Abstract:	We consider random fractals generated by random recursive constructions. We prove that the box-counting and packing dimensions of these random fractals, K, equals , their almost sure Hausdorff dimension. We show that some almost deterministic conditions known to ensure that the Hausdorff measure satisfies $0 < H^\alpha (K) < \infty$ also imply that the packing measure satisfies 0< $0 < P^\alpha (K) < \infty$ . When these conditions are not satisfied, it is known $0 = H^\alpha (K)$ . Correspondingly, we show that in this case $P^\alpha (K) = \infty$ , provided a random strong open set condition is satisfied. We also find gauge functions (t) so that the $P^\Phi$ -packing measure is finite.

Keywords:	Packing measure box-counting dimension random fractal random strong open set condition
本文献已被 SpringerLink 等数据库收录！