Theory and numerics of layered shells with variationally embedded interlaminar stresses
From MaRDI portal
Publication:2310088
DOI10.1016/j.cma.2017.08.038zbMath1439.74175OpenAlexW2751700501MaRDI QIDQ2310088
G. Knust, Werner Wagner, Friedrich Gruttmann
Publication date: 6 April 2020
Published in: Computer Methods in Applied Mechanics and Engineering (Search for Journal in Brave)
Full work available at URL: https://doi.org/10.1016/j.cma.2017.08.038
interlaminar stresseslayered plates and shellsmixed hybrid shell elementstandard nodal degrees of freedom
Related Items
On a Nonlinear Elastic Composite Shell Model with a Refined 3D Stress Analysis ⋮ A mixed finite element model with enhanced zigzag kinematics for the non-linear analysis of multilayer plates ⋮ Homogenization assumptions for coupled multiscale analysis of structural elements: beam kinematics ⋮ On the Homogenization of Nonlinear Shell ⋮ On the homogenization of a nonlinear shell ⋮ An advanced shell model for the analysis of geometrical and material nonlinear shells
Uses Software
Cites Work
- Unnamed Item
- Unnamed Item
- A coupled global-local shell model with continuous interlaminar shear stresses
- Shear correction factors for layered plates and shells
- On a stress resultant geometrically exact shell model. II: The linear theory; computational aspects
- An enhanced FSDT model for the calculation of interlaminar shear stresses in composite plate structures
- A nonlinear composite shell element with continuous interlaminar shear stresses
- A novel, single-layer model for composite plates using local-global approach
- Theories and finite elements for multilayered plates and shells: a unified compact formulation with numerical assessment and benchmarking
- A global-local higher order theory including interlaminar stress continuity and \(\text C^{0}\) plate bending element for cross-ply laminated composite plates
- Structural analysis of composite laminates using a mixed hybrid shell element
- Coupling of two- and three-dimensional composite shell elements in linear and nonlinear applications
- On the use of the first order shear deformation plate theory for the analysis of three-layer plates with thin soft core layer
- A coupled two-scale shell model with applications to layered structures
- Computational homogenization for heterogeneous thin sheets
- Rational approach for assumed stress finite elements
- A Simple Higher-Order Theory for Laminated Composite Plates
- A robust non-linear mixed hybrid quadrilateral shell element
- A mixed shell formulation accounting for thickness strains and finite strain 3d material models
- A mixed-enhanced finite-element for the analysis of laminated composite plates
- Efficient linear transverse normal stress analysis of layered composite plates
- Modelling of thick composites using a layerwise laminate theory
- On bending of elastic plates
