Kirchhoff-Love shell formulation based on triangular isogeometric analysis
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Publication:1987857
DOI10.1016/j.cma.2018.12.034zbMath1440.74213OpenAlexW2908856464WikidataQ128596704 ScholiaQ128596704MaRDI QIDQ1987857
Publication date: 16 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.2018.12.034
complex geometryisogeometric analysisKirchhoff-Love shellshell elementsrational triangular Bézier splines (rTBS)
Numerical computation using splines (65D07) Finite element methods applied to problems in solid mechanics (74S05) Shells (74K25) Finite element, Rayleigh-Ritz and Galerkin methods for boundary value problems involving PDEs (65N30)
Related Items (15)
Generalized \(C^1\) Clough-Tocher splines for CAGD and FEM ⋮ Two new triangular \(\operatorname{G}^1\)-conforming finite elements with cubic edge rotation for the analysis of Kirchhoff plates ⋮ Triangulation-based isogeometric analysis of the Cahn-Hilliard phase-field model ⋮ Feature-preserving rational Bézier triangles for isogeometric analysis of higher-order gradient damage models ⋮ CAD-compatible structural shape optimization with a movable Bézier tetrahedral mesh ⋮ Two families of two‐dimensional finite element interpolation functions of general degree with general continuity ⋮ Kirchhoff-Love shell representation and analysis using triangle configuration B-splines ⋮ Extraction and application of super-smooth cubic B-splines over triangulations ⋮ Nonlinear transient vibration of viscoelastic plates: a NURBS-based isogeometric HSDT approach ⋮ Mixed dimensional isogeometric FE-be coupling analysis for solid-shell structures ⋮ Isogeometric Bézier dual mortaring: the Kirchhoff-Love shell problem ⋮ Blended isogeometric Kirchhoff-Love and continuum shells ⋮ A stochastic multiscale formulation for isogeometric composite Kirchhoff-Love shells ⋮ Geometrically nonlinear analysis of sandwich FGM and laminated composite degenerated shells using the isogeometric finite strip method ⋮ \(C^1\) triangular isogeometric analysis of the von Karman equations
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