On the Hausdorff dimension of graphs of prevalent continuous functions on compact sets
Abstract
Let K be a compact set in with positive Hausdorff dimension. Using a Fractional Brownian Motion, we prove that in a prevalent set of continuous functions on K, the Hausdorff dimension of the graph is equal to H(K)+1. This is the largest possible value. This result generalizes a previous work due to J.M. Fraser and J.T. Hyde which was exposed in the conference Fractal and Related Fields~2. The case of α-H\"olderian functions is also discussed.
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