An exactly solvable asymmetric simple inclusion process
Abstract
We study a generalization of the asymmetric simple inclusion process (ASIP) on a periodic one-dimensional lattice, where the integers in the particles rates are deformed to their t-analogues. We call this the (q, t, θ)~ASIP, where q is the asymmetric hopping parameter and θ is the diffusion parameter. We show that this process is a misanthrope process, and consequently the steady state is independent of q. We compute the steady state, the one-point correlation and the current in the steady state. In particular, we show that the single-site occupation probabilities follow a beta-binomial distribution at t=1. We compute the two-dimensional phase diagram in various regimes of the parameters (t, θ) and perform simulations to justify the results. We also show that a modified form of the steady state weights at t ≠ 1 satisfy curious palindromic and antipalindromic symmetries. Lastly, we define an enriched process at t=1 and θ an integer which projects onto the (q, 1, θ)~ASIP and whose steady state is uniform, which may be of independent interest.
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