Mixed finite elements for port-hamiltonian models of von kármán beams.IFAC-papersonline, 54(19):186–191, 2021

Andrea Brugnoli, Ramy Rashad, Federico Califano, Stefano Stramigioli, Denis Matignon · 2021

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Structure-preserving space discretization of differential and nonlocal constitutive relations for port-Hamiltonian systems

math.NA · 2025-07-09 · unverdicted · novelty 6.0

Structure-preserving finite element discretization of port-Hamiltonian systems with differential constitutive relations via Stokes-Lagrange structures, applied to nanorod, shear beam, and nonlinear 2D Navier-Stokes models with preserved enstrophy and energy.

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Structure-preserving space discretization of differential and nonlocal constitutive relations for port-Hamiltonian systems math.NA · 2025-07-09 · unverdicted · none · ref 16
Structure-preserving finite element discretization of port-Hamiltonian systems with differential constitutive relations via Stokes-Lagrange structures, applied to nanorod, shear beam, and nonlinear 2D Navier-Stokes models with preserved enstrophy and energy.

Mixed finite elements for port-hamiltonian models of von kármán beams.IFAC-papersonline, 54(19):186–191, 2021

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