Lyapunov spectra and fluctuation relations: Insights from the Galerkin-truncated Burgers equation

TL;DR

This paper investigates the statistical and dynamical properties of a time-reversible, Galerkin-truncated Burgers equation, revealing chaotic behavior, fluctuation relations, and the role of thermalization and negative viscosity events.

Contribution

It demonstrates the equivalence of statistical properties between the time-reversible and standard Burgers equations and explores the implications of Galerkin-truncation on fluctuation relations and thermalization.

Findings

Negative viscosity events occur only in the thermalized regime.

Lyapunov spectra exhibit pairing symmetry, indicating chaos.

Fluctuation relations are satisfied, consistent with second law violations.

Abstract

The imposition of a global constraint of the conservation of total kinetic energy on a forced-dissipative Burgers equation yields a governing equation that is invariant under the time-reversal symmetry operation, $\{\mathcal{T}: t \to -t; u \to -u \}$, where $u$ is the velocity field. Moreover, the dissipation term gets strongly modified, as the viscosity is no longer a constant, but a fluctuating, state dependent quantity, which can even become negative in certain dynamical regimes. Despite these differences, the statistical properties of different dynamical regimes of the time-reversible Burgers equation and the standard forced-dssipative Burgers equation are equivalent, \`a la Gallavotti's conjecture of \textit{equivalence of nonequilibrium ensembles}. We show that the negative viscosity events occur only in the thermalized regime described by the time-reversible equation. This quasi-equilibrium regime is examined by calculating the local Lyapunov spectra and fluctuation relations. A pairing symmetry among the spectra is observed, indicating that the dynamics is chaotic and has an attractor spanning the entire phase space of the system. The violations of the second law of thermodynamics are found to be in accordance with the fluctuation relations, namely the Gallavotti-Cohen relation based on the phase-space contraction rate and the Cohen-Searles fluctuation relation based on the energy production rate. It is also argued that these violations are associated with the effects of the Galerkin-truncation, the latter is responsible for the thermalization.