@article{oai:mie-u.repo.nii.ac.jp:00007154,
 author = {Yaguchi, Hirotake},
 issue = {2},
 journal = {The Annals of Probability},
 month = {Apr},
 note = {application/pdf, Stationary measures for an interactive exclusion process on ℤ are considered. The process is such that the jump rate of each particle to the empty neighboring site is α > 0 (resp., β > 0) when another neighboring site is occupied (resp., unoccupied) by a particle, and that α ≠ β. According as α < β or α > β the process becomes nearest-neighbor attractive or repulsive, respectively. The method of relative entropy is used to determine the family ℳβ/α of stationary measures. The member of ℳγ is simply described as the probability measure having the regular clustering property which is a generalization of the exchangeable property of measures. It is shown that extremal points of ℳγ are renewal measures. Thus the structure of stationary measures for the process is completely determined.},
 pages = {556--580},
 title = {Entropy Analysis of a Nearest-Neighbor Attractive/Repulsive Exclusion Process on One-Dimensional Lattices},
 volume = {18},
 year = {1990}
}