Fractal properties of the random string processes
Abstract
Let \ut(x),t 0, x∈ R\ be a random string taking values in Rd, specified by the following stochastic partial differential equation [Funaki (1983)]: \[∂ ut(x)∂ t=∂2ut(x)∂ x2+W,\] where W(x,t) is an Rd-valued space-time white noise. Mueller and Tribe (2002) have proved necessary and sufficient conditions for the Rd-valued process \ut(x):t 0, x∈ R\ to hit points and to have double points. In this paper, we continue their research by determining the Hausdorff and packing dimensions of the level sets and the sets of double times of the random string process \ut(x):t 0, x∈ R\. We also consider the Hausdorff and packing dimensions of the range and graph of the string.
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