Improvements for the ultra weak variational formulation

Local strategies for improving the conditioning of the plane-wave ultra-weak variational formulation ⋮ Adaptive refinement for \(hp\)-version Trefftz discontinuous Galerkin methods for the homogeneous Helmholtz problem ⋮ The ultra weak variational formulation of thin clamped plate problems ⋮ Peter Monk's contributions to numerical analysis and Maxwell's equations ⋮ Dispersion analysis of plane wave discontinuous Galerkin methods ⋮ Ultra-weak variational formulation for heterogeneous Maxwell problem in the context of high performance computing ⋮ Stable approximation of Helmholtz solutions in the disk by evanescent plane waves ⋮ A Survey of Trefftz Methods for the Helmholtz Equation ⋮ Stability analysis of heterogeneous Helmholtz problems and finite element solution based on propagation media approximation ⋮ A discontinuous Galerkin Trefftz type method for solving the two dimensional Maxwell equations ⋮ A partition of unity finite element method for three-dimensional transient diffusion problems with sharp gradients ⋮ Identifying the wavenumber for the inverse Helmholtz problem using an enriched finite element formulation ⋮ Bernstein-Bézier based finite elements for efficient solution of short wave problems ⋮ Pollution studies for high order isogeometric analysis and finite element for acoustic problems ⋮ Extension of the nonconforming Trefftz virtual element method to the Helmholtz problem with piecewise constant wave number ⋮ A comparison of high-order polynomial and wave-based methods for Helmholtz problems ⋮ Implementation of an interior point source in the ultra weak variational formulation through source extraction ⋮ The discontinuous enrichment method for medium-frequency Helmholtz problems with a spatially variable wavenumber ⋮ Learning dominant wave directions for plane wave methods for high-frequency Helmholtz equations ⋮ A partition of unity finite element method for nonlinear transient diffusion problems in heterogeneous materials ⋮ Plane wave approximation in linear elasticity ⋮ An oversampled collocation approach of the wave based method for Helmholtz problems ⋮ Residual-Based Adaptivity and PWDG Methods for the Helmholtz Equation

• Combining the ultra-weak variational formulation and the multilevel fast multipole method
• Solving Maxwell's equations using the ultra weak variational formulation
• Coupling of the ultra-weak variational formulation and an integral representation using a fast multipole method in electromagnetism
• A domain decomposition method for the Helmholtz equation and related optimal control problems
• The partition of unity finite element method: basic theory and applications
• A discontinuous Galerkin method with Lagrange multipliers for the solution of Helmholtz problems in the mid-frequency regime
• Computational aspects of the ultra-weak variational formulation
• Vekua theory for the Helmholtz operator
• Plane wave approximation of homogeneous Helmholtz solutions
• A least-squares method for the Helmholtz equation
• Discontinuous Galerkin methods with plane waves for time-harmonic problems
• Plane wave decomposition in the unit disc: convergence estimates and computational aspects
• A discontinuous enrichment method for capturing evanescent waves in multiscale fluid and fluid/solid problems
• The variational theory of complex rays for the calculation of medium‐frequency vibrations
• Overview of the discontinuous enrichment method, the ultra-weak variational formulation, and the partition of unity method for acoustic scattering in the medium frequency regime and performance comparisons
• Plane Wave Discontinuous Galerkin Methods for the 2D Helmholtz Equation: Analysis of the p-Version
• An Exponentially Convergent Nonpolynomial Finite Element Method for Time-Harmonic Scattering from Polygons
• Error estimates for the Ultra Weak Variational Formulation of the Helmholtz equation
• A discontinuous enrichment method for three-dimensional multiscale harmonic wave propagation problems in multi-fluid and fluid-solid media
• Comparison of two wave element methods for the Helmholtz problem
• Plane wave discontinuous Galerkin methods: Analysis of theh-version
• The Adaptive Computation of Far-Field Patterns by A Posteriori Error Estimation of Linear Functionals
• Application of an Ultra Weak Variational Formulation of Elliptic PDEs to the Two-Dimensional Helmholtz Problem
• The Ultra Weak Variational Formulation Using Bessel Basis Functions
• The Ultra-Weak Variational Formulation for Elastic Wave Problems
• Ultra-Weak Variational Formulation and efficient Integral Representation in Electromagnetism: a thorough study of the algorithm complexity
• The perfectly matched layer for the ultra weak variational formulation of the 3D Helmholtz equation
• The discontinuous enrichment method