Coupling, Attractiveness and Hydrodynamics for Conservative Particle Systems

TL;DR

This paper develops a comprehensive framework for attractiveness and hydrodynamics in generalized conservative particle systems, extending coupling methods beyond simple exclusion to models with multiple particle jumps.

Contribution

It provides necessary and sufficient conditions for attractiveness in multi-particle jump models and constructs coupled processes with non-increasing discrepancies.

Findings

Characterization of attractiveness conditions for generalized misanthrope models

Construction of coupled processes with non-increasing discrepancies

Derivation of hydrodynamic limits for specific models

Abstract

Attractiveness is a fundamental tool to study interacting particle systems and the basic coupling construction is a usual route to prove this property, as for instance in simple exclusion. The derived Markovian coupled process $(\xi_t,\zeta_t)_{t\geq 0}$ satisfies: (A) if $\xi_0\leq\zeta_0$ (coordinate-wise), then for all $t\geq 0$, $\xi_t\leq\zeta_t$ a.s. In this paper, we consider generalized misanthrope models which are conservative particle systems on $\Z^d$ such that, in each transition, $k$ particles may jump from a site $x$ to another site $y$, with $k\geq 1$. These models include simple exclusion for which $k=1$, but, beyond that value, the basic coupling construction is not possible and a more refined one is required. We give necessary and sufficient conditions on the rates to insure attractiveness; we construct a Markovian coupled process which both satisfies (A) and makes discrepancies between its two marginals non-increasing. We determine the extremal invariant and translation invariant probability measures under general irreducibility conditions. We apply our results to examples including a two-species asymmetric exclusion process with charge conservation (for which $k\le 2$) which arises from a Solid-on-Solid interface dynamics, and a stick process (for which $k$ is unbounded) in correspondence with a generalized discrete Hammersley-Aldous-Diaconis model. We derive the hydrodynamic limit of these two one-dimensional models.