On the Action of Multiplicative Cascades on Measures

J. Barral, Xiong Jin
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引用次数: 2

Abstract

We consider the action of Mandelbrot multiplicative cascades on the probability measures supported on a symbolic space, especially the ergodic measures. For general probability measures, we obtain almost a sharp criterion of non-degeneracy of the limiting measure; it relies on the lower and upper Hausdorff dimensions of the measure and the entropy of the weights generating the cascade. We also obtain sharp general bounds for the lower Hausdorff and upper packing dimensions of the limiting random measure when it is non-degenerate. When the original measure is a Gibbs measure associated with a measurable potential, all our results are sharp. This improves on results previously obtained by Kahane and Peyriere, Ben Nasr, and Fan, who considered the case of Markov measures. We exploit our results on general measures to derive dimensions estimates for some random measures on Bedford-McMullen carpets, as well as absolute continuity properties, with respect to their expectation, of the projections of some random statistically self-similar measures.
论倍增级联对测度的作用
我们考虑了Mandelbrot乘级联对符号空间上支持的概率测度的作用,特别是遍历测度。对于一般概率测度,我们几乎得到了极限测度不简并性的一个尖锐判据;它依赖于测量的上下豪斯多夫维和产生级联的权重的熵。我们还得到了极限随机测度在非简并情况下的下Hausdorff维数和上填充维数的明确的一般界。当原始测度是与可测势相关联的吉布斯测度时,我们所有的结果都是清晰的。这改进了Kahane、Peyriere、Ben Nasr和Fan先前考虑马尔可夫测度的结果。我们利用我们在一般测度上的结果,推导出Bedford-McMullen地毯上一些随机测度的维估计,以及一些随机统计自相似测度的投影相对于它们的期望的绝对连续性性质。
本文章由计算机程序翻译,如有差异,请以英文原文为准。
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