Abstract
An analytical method based on the classical ruin problem is developed to compute the mean reaction time between two walkers undergoing a generalized random walk on a 1 d lattice. At each time step, either both walkers diffuse simultaneously with probability p (synchronous event) or one of them diffuses while the other remains immobile with complementary probability (asynchronous event). Reaction takes place through same site occupation or position exchange. We study the influence of the degree of synchronicity p of the walkers and the lattice size N on the global reaction's efficiency. For odd N, the purely synchronous case ( p=1) is always the most effective one, while for even N, the encounter time is minimized by a combination of synchronous and asynchronous events. This new parity effect is fully confirmed by Monte Carlo simulations on 1 d lattices as well as for 2 d and 3 d lattices. In contrast, the 1 d continuum approximation valid for sufficiently large lattices predicts a monotonic increase of the efficiency as a function of p. The relevance of the model for several research areas is briefly discussed.
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