Hydrodynamic limit for an active-passive exclusion process

TL;DR

This paper derives hydrodynamic equations for a lattice gas model of active-passive particle mixtures with exclusion, addressing mathematical challenges posed by continuous orientations and mixed particle types.

Contribution

It introduces a hydrodynamic limit for an active-passive exclusion process with continuous orientations, extending non-gradient methods and spectral gap estimates.

Findings

Derived hydrodynamic equations for active-passive mixtures

Addressed mathematical challenges with continuous orientations

Extended non-gradient decomposition techniques

Abstract

The collective non-equilibrium dynamics of multi-component mixtures of interacting active (self-propelled) and passive (diffusive) particles have garnered great interest in the physics community. However, the mathematical understanding of these systems remains partial. In this work, we consider a lattice gas model of active-passive particle mixtures with exclusion, where the self-propulsion orientations of active particles undergo Brownian motion on a torus. We derive the hydrodynamic equations governing the particle densities. Due to the presence of two types of particles with continuous-valued orientations, further generalizations of non-gradient decomposition and spectral gap estimation developed for the pure active case are necessitated, which entails novel challenges and new proofs.