Proportion of Unaffected Sites in a Reaction-Diffusion Process
Abstract
We consider the probability P(t) that a given site remains unvisited by any of a set of random walkers in d dimensions undergoing the reaction A+A0 when they meet. We find that asymptotically P(t) t-θ with a universal exponent θ=12-O(ε) for d=2-ε, while, for d>2, θ is non-universal and depends on the reaction rate. The analysis, which uses field-theoretic renormalisation group methods, is also applied to the reaction kA0 with k>2. In this case, a stretched exponential behaviour is found for all d≥1, except in the case k=3, d=1, where P(t) e- ( t)3/2.
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