Shape optimization of Maxwell eigenvalues via adjoint sensitivities on a reference domain, solved with a damped inverse BFGS method and mixed finite elements.
An augmented lagrangian treatment of contact problems involving friction
3 Pith papers cite this work. Polarity classification is still indexing.
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UNVERDICTED 3representative citing papers
A conformal finite element and implicit Euler discretization is proposed and analyzed for the Biot-contact variational problem, proving existence, uniqueness, stability, and a priori error estimates, with numerical verification of the rates.
A POD-RBF reduced-order model predicts parametrized unsteady Navier-Stokes flows with periodic boundary changes, shown on cylinder flow to cut CPU time over 99% with under 5.2% accuracy loss.
citing papers explorer
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Numerical analysis of the Biot equations coupled to frictional contact mechanics
A conformal finite element and implicit Euler discretization is proposed and analyzed for the Biot-contact variational problem, proving existence, uniqueness, stability, and a priori error estimates, with numerical verification of the rates.
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Reduced-order modelling of parametrized unsteady Navier-Stokes equations and application to flow around cylinders with periodic changing boundary conditions
A POD-RBF reduced-order model predicts parametrized unsteady Navier-Stokes flows with periodic boundary changes, shown on cylinder flow to cut CPU time over 99% with under 5.2% accuracy loss.