Abstract
AbstractThis paper concerns the intermediate dimensions, a spectrum of dimensions that interpolate between the Hausdorff and box dimensions. Potential-theoretic methods are used to produce dimension bounds for images of sets under Hölder maps and certain stochastic processes. We apply this to compute the almost-sure value of the dimension of Borel sets under index-$$\alpha $$
α
fractional Brownian motion in terms of dimension profiles defined using capacities. As a corollary, this establishes continuity of the profiles for Borel sets and allows us to obtain an explicit condition showing how the Hausdorff dimension of a set may influence the typical box dimension of Hölder images such as projections. The methods used propose a general strategy for related problems; dimensional information about a set may be learned from analysing particular fractional Brownian images of that set. To conclude, we obtain bounds on the Hausdorff dimension of exceptional sets, with respect to intermediate dimensions, in the setting of projections.
Funder
Carnegie Trust for the Universities of Scotland
London Mathematical Society
Publisher
Springer Science and Business Media LLC
Subject
Statistics, Probability and Uncertainty,General Mathematics,Statistics and Probability
Reference18 articles.
1. Burrell, S.A., Falconer, K.J., Fraser, J.M.: Projection theorems for intermediate dimensions. J. Fract. Geom. 8(2), 95–116 (2021)
2. Falconer, K.J.: Hausdorff dimension and the exceptional set of projections. Mathematika 29, 109–115 (1982)
3. Falconer, K.J.: Fractal Geometry: Mathematical Foundations and Applications. Wiley, Hoboken (1990)
4. Falconer, K.J.: A capacity approach to box and packing dimensions of projections and other images. preprint, available at: arXiv:1711.05316
5. Falconer, K.J.: A capacity approach to box and packing dimensions of projections of sets and exceptional directions. J. Fract. Geom. (to appear). arXiv:1901.11014
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