Irreversible Port-Hamiltonian Formulations for 1-Dimensional fluid systems

TL;DR

This paper extends the Irreversible Port-Hamiltonian Systems framework to model non-isentropic fluids with viscous dissipation, incorporating convective transport and thermodynamic laws in a boundary-controlled setting.

Contribution

It introduces an extended IPHS formulation for non-isentropic fluids, including convective transport and boundary port parametrization that respects thermodynamic laws.

Findings

Successfully models viscous, non-isentropic fluids within IPHS framework

Incorporates convective transport into the IPHS formulation

Defines boundary controlled IPHS consistent with thermodynamics

Abstract

The Irreversible Port-Hamiltonian Systems (IPHS) framework is extended to the modelling of non-isentropic fluids with viscous dissipation in the Eulerian description. Building on earlier IPHS formulations for diffusion-driven and non-convective distributed systems, it is shown that convective transport can be consistently encompassed by the framework by modifying the underlying differential operators. After revisiting the constitutive relations of non-isentropic fluids in both Eulerian and Lagrangian coordinates, it is demonstrate how these systems fit within an extended IPHS formulation. Furthermore, an extended parametrisation of the boundary port variables which ensures that the first and second laws of Thermodynamics are fulfilled allows to define a general class of boundary controlled IPHS.