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Finite elements based on Jacobi shape functions for the analysis of beams, plates and shells

A. Pagani, Erasmo Carrera, Daniele Scano, R. Augello

2023International Journal for Numerical Methods in Engineering11 citationsDOIOpen Access PDF

Abstract

Abstract This paper proposes the use of Jacobi polynomials to approximate higher‐order theories of beam, plate, and shell structures. The Carrera unified formulation is used in this context to express displacement kinematics in a hierarchical form. In this manner, classical to complex higher‐order theories can be implemented with ease. Particular attention is focused on the attenuation and the correction of the shear locking. Therefore, reduced integration as well as mixed interpolation of tensorial components methods are investigated against the new finite elements. Several case studies are taken into account to highlight the effectiveness and robustness of the proposed approach. Also, several benchmarks are provided for future assessments.

Topics & Concepts

KinematicsRobustness (evolution)Interpolation (computer graphics)Finite element methodContext (archaeology)Applied mathematicsMathematicsComputer scienceAlgorithmAlgebra over a fieldStructural engineeringEngineeringPure mathematicsPhysicsClassical mechanicsArtificial intelligenceGeologyMotion (physics)GeneChemistryPaleontologyBiochemistryComposite Structure Analysis and OptimizationStructural Load-Bearing AnalysisDynamics and Control of Mechanical Systems
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