Abstract
We consider random recursive fractals and prove fine results about their local behaviour. We show that for a class of random recursive fractals the usual multifractal spectrum is trivial in that all points have the same local dimension. However, by examining the local behaviour of the measure at typical points in the set, we establish the size of fine fluctuations in the measure. The results are proved using a large deviation principle for a class of general branching processes which extends the known large deviation estimates for the supercritical Galton-Watson process.
Publisher
Cambridge University Press (CUP)
Subject
Applied Mathematics,Statistics and Probability
Reference24 articles.
1. The exact hausdorff dimension of a branching set
2. [14] Kolumbán J. and Soós A. (2001). Self-similar random fractal measure using contraction method in probabilistic metric spaces. Preprint.
3. The exact Hausdorff dimension in random recursive constructions;Graf;Mem. Amer. Math. Soc.,1988
4. Thin points for Brownian motion
5. Large deviations in the supercritical branching process
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