Solitons in fluctuating hydrodynamics of diffusive processes

TL;DR

This paper reveals that certain one-dimensional fluctuating hydrodynamic systems derived from diffusive processes naturally develop solitons and nonlinear waves, with detailed analysis of specific models like KMP and SEP.

Contribution

It derives explicit soliton solutions for these systems and uncovers a nonlinear transformation linking different models, highlighting their distinct wave properties.

Findings

KMP model exhibits birefringent sound waves.

SEP model's sound waves are trivial.

Solitons relate to instability onset in the models.

Abstract

We demonstrate that fluid mechanical systems arising from large fluctuations of one-dimensional statistical processes generically exhibit solitons and nonlinear waves. We derive the explicit form of these solutions and examine their properties for the specific cases of the Kipnis-Marchioro-Presutti model (KMP) and the Symmetric Exclusion Process (SEP). We show that the two fluid systems are related by a nonlinear transformation, which reveals an additional symmetry in the SEP system, but still have markedly different properties. In particular, the KMP fluid has a nontrivial sound wave spectrum exhibiting birefringence, while sound waves for the SEP fluid are essentially trivial. The appearance of sound waves and soliton configurations in the KMP model is related to the onset of instabilities.