TASEP hydrodynamics using microscopic characteristics

TL;DR

This paper provides a new proof of the convergence of TASEP to Burgers equation solutions, emphasizing the role of second class particles and characteristics, simplifying previous methods especially in shock cases.

Contribution

It introduces a novel approach using second class particles to analyze TASEP hydrodynamics, avoiding subadditivity and simplifying existing proofs.

Findings

Laws of large numbers for tagged particles and fluxes

Characterization of second class particles transport

Simplified proofs in shock cases

Abstract

The convergence of the totally asymmetric simple exclusion process to the solution of the Burgers equation is a classical result. In his seminal 1981 paper, Herman Rost proved the convergence of the density fields and local equilibrium when the limiting solution of the equation is a rarefaction fan. An important tool of his proof is the subadditive ergodic theorem. We prove his results by showing how second class particles transport the rarefaction-fan solution, as characteristics do for the Burgers equation, avoiding subadditivity. In the way we show laws of large numbers for tagged particles, fluxes and second class particles, and simplify existing proofs in the shock cases. The presentation is self contained.