TY - BOOK ID - 145951504 TI - Finite Elements and Symmetry PY - 2020 PB - Basel, Switzerland MDPI - Multidisciplinary Digital Publishing Institute DB - UniCat KW - Research & information: general KW - Mathematics & science KW - Oseen problem KW - corner singularity KW - weighted finite element method KW - preconditioning KW - symmetric boundary condition KW - pattern formation KW - computational design KW - finite-element method KW - three-layer composite shell KW - Mindlin plate theory KW - finite element method KW - force vibration KW - FGMshells KW - edge-based smoothed finite element method (ES-FEM) KW - mixed interpolation of tensorial components (MITC) KW - electromagnetic scattering KW - time-harmonic electromagnetic fields KW - moving media KW - rotating axisymmetric objects KW - bianisotropic media KW - variational formulation KW - well posedness KW - convergence of the approximation KW - Oseen problem KW - corner singularity KW - weighted finite element method KW - preconditioning KW - symmetric boundary condition KW - pattern formation KW - computational design KW - finite-element method KW - three-layer composite shell KW - Mindlin plate theory KW - finite element method KW - force vibration KW - FGMshells KW - edge-based smoothed finite element method (ES-FEM) KW - mixed interpolation of tensorial components (MITC) KW - electromagnetic scattering KW - time-harmonic electromagnetic fields KW - moving media KW - rotating axisymmetric objects KW - bianisotropic media KW - variational formulation KW - well posedness KW - convergence of the approximation UR - https://www.unicat.be/uniCat?func=search&query=sysid:145951504 AB - This Special Issue of the journal Symmetry contains a collection of papers devoted to the use of symmetry in finite element approximation of partial differential equations. More specifically, applications ranging from mechanical engineering to electromagnetics and fluid dynamics are considered. Both theoretical and computational aspects are considered. The contributions were selected to ensure the widest variety of themes. In particular, we wanted to include both theoretical papers (well posedness, stability) and numerical computations. ER -