Exactly solvable models through the empty interval method, for more-than-two-site interactions

Abstract

Single-species reaction-diffusion systems on a one-dimensional lattice are considered, in them more than two neighboring sites interact. Constraints on the interaction rates are obtained, that guarantee the closedness of the time evolution equation for En(t)'s, the probability that n consecutive sites are empty at time t. The general method of solving the time evolution equation is discussed. As an example, a system with next-nearest-neighbor interaction is studied.

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