A simple and efficient element for axisymmetric shells
From MaRDI portal
Publication:4138287
DOI10.1002/nme.1620111006zbMath0363.73072OpenAlexW2004545561WikidataQ59487099 ScholiaQ59487099MaRDI QIDQ4138287
No author found.
Publication date: 1977
Published in: International Journal for Numerical Methods in Engineering (Search for Journal in Brave)
Full work available at URL: https://www.scipedia.com/public/Samper_et_al_2018n
Related Items (14)
A simple and efficient mixed harmonic element for shells of revolution ⋮ Numerical analysis of viscoplastic axisymmetric shells based on a hybrid strain finite element ⋮ Shear-deformable axisymmetric conical shell element with 6 DOF and convergence of \(O(h^ 4)\) ⋮ Nonlinear finite element analysis of shells. I. Three-dimensional shells ⋮ Nonlinear finite element analysis of shells. II. Two-dimensional shells ⋮ Algorithms for nonlinear contact constraints with application to stability problems of rods and shells ⋮ A higher-order hybrid-mixed harmonic shell-of-revolution element ⋮ Higher‐order hybrid‐mixed axisymmetric thick shell element for vibration analysis ⋮ A functional for shells of arbitrary geometry and a mixed finite element method for parabolic and circular cylindrical shells ⋮ On mixed finite element methods for axisymmetric shell analysis ⋮ A nodal integration axisymmetric thin shell model using linear interpolation ⋮ Nonlinear stability-analysis of shell and contact-problems including branch-switching ⋮ A priori identification of shear locking and stiffening in triangular Mindlin elements ⋮ A Kirchhoff-mode method for \(C^ 0\) bilinear and Serendipity plate elements
This page was built for publication: A simple and efficient element for axisymmetric shells
