Scale dependence of distributions of hotspots
Abstract
We consider a random field φ(r) in d dimensions which is largely concentrated around small `hotspots', with `weights', wi. These weights may have a very broad distribution, such that their mean does not exist, or else is not a useful estimate. In such cases, the median W of the total weight W in a region of size R is an informative characterisation of the weights. We define the function F by W=F( R). If F'(x)>d, the distribution of hotspots is dominated by the largest weights. In the case where F'(x)-d approaches a constant positive value when R ∞, the hotspots distribution has a type of scale-invariance which is different from that of fractal sets, and which we term ultradimensional. The form of the function F(x) is determined for a model of diffusion in a random potential.
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