From steady-state TASEP model with open boundaries to 1D Ising model at negative fugacity
Abstract
We demonstrate here a series of exact mappings between particular cases of four statistical physics models: equilibrium 1-dimensional lattice gas with nearest-neighbor repulsion, (1+1)-dimensional combinatorial heap of pieces, random walks on half-plane and totally asymmetric simple exclusion process (TASEP) in one dimension (1D). In particular, we show that generating function of a steady state of one-dimensional TASEP with open boundaries can be interpreted as a quotient of partition functions of 1D hard-core lattice gases with one adsorbing lattice site and negative fugacity. This result is based on the combination of (i) a representation of the steady-state TASEP configurations in terms of (1+1)-dimensional heaps of pieces and (ii) a theorem connecting the partition function of (1+1)-dimensional heaps of pieces with that of a single layer of pieces, which in this case is a 1D hard-core lattice gas.
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