Port-Hamiltonian modelling of fluid dynamics models with variable cross-section

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Abstract

Many single- and multi-phase fluid dynamical systems are governed by non-linear evolutionary equations. A key aspect of these systems is that the fluid typically flows across spatially and temporally varying cross-sections. We, first, show that not any choice of state-variables may be apt for obtaining a port-Hamiltonian realization under spatially varying cross-section. We propose a modified choice of the state-variables and then represent fluid dynamical systems in port-Hamiltonian representations. We define these port-Hamiltonian representations under spatial variation in the cross-section with respect to a new proposed state-dependent and extended Stokes- Dirac structure. Finally, we account for temporal variations in the cross-section and obtain a suitable structure that respects key properties, such as, for instance, the property of dissipation inequality.
Original languageEnglish
Pages (from-to)365-372
Number of pages8
JournalIFAC-PapersOnLine
Volume54
Issue number9
DOIs
Publication statusPublished - 1 Jun 2021
Event24th International Symposium on Mathematical Theory of Networks and Systems, MTNS 2020 - -, Cambridge, United Kingdom
Duration: 23 Aug 202127 Aug 2021
Conference number: 24
https://mtns2020.eng.cam.ac.uk/

Keywords

  • Dissipation inequality
  • Evolutionary equations
  • Multi-phase
  • Non-linear
  • Port-hamiltonian
  • Stokes-Dirac structure
  • Varying cross-sections

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