Gibbs measures on permutations over one-dimensional discrete point sets

We consider Gibbs distributions on permutations of a locally finite infinite set X.R, where a permutation . of X is assigned (formal) energy .x.XV(.(x).x). This is motivated by Feynman.s path representation of the quantum Bose gas; the choice X:=Z and V(x):=.x2 is of principal interest. Under suitable regularity conditions on the set X and the potential V, we establish existence and a full classification of the infinite-volume Gibbs measures for this problem, including a result on the number of infinite cycles of typical permutations. Unlike earlier results, our conclusions are not limited to small densities and/or high temperatures.