Vorticity and level-set variations of invariant current bound steady-state dissipation

Abstract

A non-vanishing entropy production rate is a hallmark of non-equilibrium stationary states and is therefore at the heart of non-equilibrium thermodynamics. It is a manifestation of a steady circulation J inv along the level sets of the invariant density inv, and is thus generically used to quantify how far a steady system is driven out of equilibrium. While it is well known that there exists a continuum of distinct steady states with the same invariant measure, the question how the geometry and topology of the invariant current a priori affect dissipation remained elusive. For confined irreversible diffusions we identify two minimal descriptors, the inv-weighted vorticity and the variation of J inv along level sets of inv, and prove that these jointly bound from above the steady-state entropy production rate. In regions where inv is close to Gaussian the bound is dominated solely by the vorticity of the drift field and in the low-noise (Freidlin-Wentzel) limit by any non-potential contribution to the drift, rendering J inv virtually constant along the level sets of inv.