Characterization of invariant measures at the leading edge for competing particle systems

Article

Ruzmaikina, A; Aizenman, M

University of Virginia; Purdue University System; Purdue University; Purdue University System; Purdue University; Princeton University; Princeton University

ANNALS OF PROBABILITY

0091-1798

10.1214/009117904000000865

2005

82-113

We study systems of particles on a line which have a maximum, are locally finite and evolve with independent increments. Quasi-stationary states are defined as probability measures, on the sigma-algebra generated by the gap variables, for which joint distribution of gaps between particles is invariant under the time evolution. Examples are provided by Poisson processes with densities of the form rho(dx) = e(-sx) sdx, with s > 0, and linear superpositions of such measures. We show that, conversely, any quasi-stationary state for the independent dynamics, with an exponentially bounded integrated density of particles, corresponds to a superposition of Poisson processes with densities rho(dx) = e(-sx) sdx with s > 0, restricted to the relevant sigma-algebra. Among the systems for which this question is of some relevance are spin-glass models of statistical mechanics, where the point process represents the collection of the free energies of distinct pure states, the time evolution corresponds to the addition of a spin variable and the Poisson measures described above correspond to the so-called REM states.