Continuous time random walk as a random walk in a random environment
Abstract
We show that for a weakly dense subset of the domain of attraction of a positive stable random variable of index 0<α<1(DOA(α)) the functional stable convergence is a time-changed renewal convergence of distribution of finite mean. Applied to Continuous Time Random Walk(CTRW) \'a la Montroll and Wiess we show that CTRW with renewal times in a weakly dense set of DOA(α) can be realized as random walk in a random environment. We find the quenched limit and give a bound on the error of the approximation.
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