A mixed finite element for shell model with free edge boundary conditions. I: The mixed variational formulation. II: The numerical scheme
From MaRDI portal
Publication:1913213
DOI10.1016/0045-7825(94)00676-EzbMath0852.73059MaRDI QIDQ1913213
Michel Salaün, Philippe Destuynder
Publication date: 24 November 1996
Published in: Computer Methods in Applied Mechanics and Engineering (Search for Journal in Brave)
Lagrange multipliererror estimateKirchhoff-Love kinematical assumptionrotation of normal to medium surface
Related Items
Adaptive mesh refinements for thin shells whose middle surface is not exactly known, An Eulerian approach for large displacements of thin shells including geometrical nonlinearities, A mixed finite element for shell model with free edge boundary conditions. III: Numerical aspects, Unnamed Item, Finite element linear and nonlinear, static and dynamic analysis of structural elements: a bibliography (1992‐1995), Finite element solution of a Reynolds-Koiter coupled problem for the elastic journal-bearing, Approximation of shell geometry for nonlinear analysis, Approximation of shell geometry for nonlinear analysis, Mixed finite element methods based on Riesz-representing operators for the shell problem, Mathematical analysis and numerical simulation of a Reynolds-Koiter model for the elastohydrodynamic journal-bearing device
Cites Work
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- Unnamed Item
- A new finite element scheme for bending plates
- Some numerical aspects of mixed finite elements for bending plates
- Studies in plate flexure. I: A mixed finite element formulation for Reissner-Mindlin plate theory: Uniform convergence of all higher-order spaces
- Analysis of some low-order finite element schemes for Mindlin-Reissner and Kirchhoff plates
- Thin shell theory. New Trends and applications
- An analysis of a mixed finite element method for the Navier-Stokes equations
- Shear and membrane locking in curved \(C^ 0\) elements
- Transverse shear oscillations in four-node quadrilateral plate elements
- A formulation of general shell elements—the use of mixed interpolation of tensorial components
- Numerical Approximation of Mindlin-Reissner Plates
- Finite Elements Based Upon Mindlin Plate Theory With Particular Reference to the Four-Node Bilinear Isoparametric Element
- A study of three-node triangular plate bending elements
- A simple and efficient finite element for plate bending
- A simple quadrilateral shell element
