
The authors introduce an infinite-dimensional port-Hamiltonian (pH) formulation of the compressible non-isothermal Euler equations to model temperature-dependent fluid flow in energy networks. They establish the underlying Stokes-Dirac structure, derive the boundary port variables, and incorporate energy-preserving coupling conditions to enable structure-preserving coupling of the fluid flow system with other network components.


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efficient-modeling-and-numerical-approximation-of-thermodynamic-compressible-fluid-flow-in-energy-networks


Efficient Modeling and Numerical Approximation of Thermodynamic Compressible Fluid Flow in Energy Networks
