A robust Petrov-Galerkin discretisation of convection-diffusion equations

Local analysis of HDG methods for convection-dominated diffusion problems ⋮ Analysis of backward Euler primal DPG methods ⋮ A Petrov-Galerkin method for nonlocal convection-dominated diffusion problems ⋮ Adaptive anisotropic Petrov-Galerkin methods for first order transport equations ⋮ A first order system least squares method for the Helmholtz equation ⋮ A Local Meshless Method for Steady State Convection Dominated Flows ⋮ Robust coupling of DPG and BEM for a singularly perturbed transmission problem ⋮ DPG method with optimal test functions for a fractional advection diffusion equation ⋮ Efficient discretization and preconditioning of the singularly perturbed reaction-diffusion problem ⋮ Combining the DPG method with finite elements ⋮ A Robust DPG Method for Singularly Perturbed Reaction-Diffusion Problems ⋮ A pollution-free ultra-weak FOSLS discretization of the Helmholtz equation ⋮ Adaptive hybridizable discontinuous Galerkin methods for nonstationary convection diffusion problems ⋮ Minimal residual methods in negative or fractional Sobolev norms ⋮ Eliminating Gibbs phenomena: a non-linear Petrov-Galerkin method for the convection-diffusion-reaction equation ⋮ State Estimation—The Role of Reduced Models ⋮ On the stability of DPG formulations of transport equations ⋮ A DPG Framework for Strongly Monotone Operators ⋮ On the coupling of DPG and BEM ⋮ An ultraweak formulation of the Kirchhoff–Love plate bending model and DPG approximation ⋮ Superconvergence in a DPG method for an ultra-weak formulation ⋮ Minimal residual space-time discretizations of parabolic equations: asymmetric spatial operators ⋮ A stabilised finite element method for the convection-diffusion-reaction equation in mixed form ⋮ A time-stepping DPG scheme for the heat equation ⋮ Isogeometric residual minimization method (iGRM) with direction splitting for non-stationary advection-diffusion problems ⋮ Asymptotically exact a posteriori error estimators for first-order div least-squares methods in local and global \(L_2\) norm ⋮ DPG method with optimal test functions for a transmission problem ⋮ An enriched Galerkin-characteristics finite element method for convection-dominated and transport problems ⋮ Notes on a saddle point reformulation of mixed variational problems ⋮ The double adaptivity paradigm. (How to circumvent the discrete inf-sup conditions of Babuška and Brezzi) ⋮ An \(L^p\)-DPG method for the convection-diffusion problem ⋮ A machine-learning minimal-residual (ML-MRes) framework for goal-oriented finite element discretizations ⋮ Isogeometric residual minimization (iGRM) for non-stationary Stokes and Navier-Stokes problems ⋮ Saddle point least squares for the reaction-diffusion problem

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• A class of discontinuous Petrov-Galerkin methods. IV: The optimal test norm and time-harmonic wave propagation in 1D
• Approximate symmetrization and Petrov-Galerkin methods for diffusion- convection problems
• Streamline upwind/Petrov-Galerkin formulations for convection dominated flows with particular emphasis on the incompressible Navier-Stokes equations
• Some observations on Babuška and Brezzi theories
• The discontinuous Petrov-Galerkin method for elliptic problems
• Estimation of iterated matrices, with application to the von Neumann condition
• Adaptivity and variational stabilization for convection-diffusion equations
• Robust DPG Method for Convection-Dominated Diffusion Problems
• An analysis of the practical DPG method
• A hybrid mixed discontinuous Galerkin finite-element method for convection-diffusion problems
• A class of discontinuous Petrov-Galerkin methods. II. Optimal test functions
• Iterative Methods by Space Decomposition and Subspace Correction
• An analysis of the convergence of mixed finite element methods
• Hierarchical basis methods for hypersingular integral equations
• Adaptive Petrov--Galerkin Methods for First Order Transport Equations
• Computational scales of Sobolev norms with application to preconditioning
• Problèmes aux limites pour les équations aux dérivées partielles du premier ordre à coefficients réels; théorèmes d'approximation; application à l'équation de transport