Article
Publicly Available
Frontmatter
Published/Copyright:
July 1, 2017
Published Online: 2017-7-1
Published in Print: 2017-7-1
© 2017 Walter de Gruyter GmbH, Berlin/Boston
Articles in the same Issue
- Frontmatter
- One Hundred Years of the Galerkin Method
- An hp-Hybrid High-Order Method for Variable Diffusion on General Meshes
- Weakly Imposed Symmetry and Robust Preconditioners for Biot’s Consolidation Model
- Numerical Methods for Simulating the Motion of Porous Balls in Simple 3D Shear Flows Under Creeping Conditions
- On Finite Element Formulations for the Obstacle Problem – Mixed and Stabilised Methods
- Block Circulant and Toeplitz Structures in the Linearized Hartree–Fock Equation on Finite Lattices: Tensor Approach
- Rank Structured Approximation Method for Quasi-Periodic Elliptic Problems
- Error Analysis of Randomized Runge–Kutta Methods for Differential Equations with Time-Irregular Coefficients
- On Well-Posedness for a Piezo-Electromagnetic Coupling Model with Boundary Dynamics
- A Posteriori Modelling-Discretization Error Estimate for Elliptic Problems with L∞-Coefficients
Articles in the same Issue
- Frontmatter
- One Hundred Years of the Galerkin Method
- An hp-Hybrid High-Order Method for Variable Diffusion on General Meshes
- Weakly Imposed Symmetry and Robust Preconditioners for Biot’s Consolidation Model
- Numerical Methods for Simulating the Motion of Porous Balls in Simple 3D Shear Flows Under Creeping Conditions
- On Finite Element Formulations for the Obstacle Problem – Mixed and Stabilised Methods
- Block Circulant and Toeplitz Structures in the Linearized Hartree–Fock Equation on Finite Lattices: Tensor Approach
- Rank Structured Approximation Method for Quasi-Periodic Elliptic Problems
- Error Analysis of Randomized Runge–Kutta Methods for Differential Equations with Time-Irregular Coefficients
- On Well-Posedness for a Piezo-Electromagnetic Coupling Model with Boundary Dynamics
- A Posteriori Modelling-Discretization Error Estimate for Elliptic Problems with L∞-Coefficients
