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Stress-Based FEM in the Problem of Bending of Euler–Bernoulli and Timoshenko Beams Resting on Elastic Foundation

Zdzisław Więckowski, Paulina Świątkiewicz

2021Materials15 citationsDOIOpen Access PDF

Abstract

The stress-based finite element method is proposed to solve the static bending problem for the Euler-Bernoulli and Timoshenko models of an elastic beam. Two types of elements-with five and six degrees of freedom-are proposed. The elaborated elements reproduce the exact solution in the case of the piece-wise constant distributed loading. The proposed elements do not exhibit the shear locking phenomenon for the Timoshenko model. The influence of an elastic foundation of the Winkler type is also taken into consideration. The foundation response is approximated by the piece-wise constant and piece-wise linear functions in the cases of the five-degrees-of-freedom and six-degrees-of-freedom elements, respectively. An a posteriori estimation of the approximate solution error is found using the hypercircle method with the addition of the standard displacement-based finite element solution.

Topics & Concepts

Finite element methodTimoshenko beam theoryDegrees of freedom (physics and chemistry)Bernoulli's principleConstant (computer programming)Euler's formulaStructural engineeringBendingFoundation (evidence)Stress (linguistics)Displacement (psychology)Mathematical analysisStiffnessBeam (structure)A priori and a posterioriMathematicsPhysicsEngineeringComputer scienceThermodynamicsPhilosophyPsychotherapistHistoryQuantum mechanicsProgramming languagePsychologyLinguisticsEpistemologyArchaeologyNumerical methods in engineeringComposite Structure Analysis and OptimizationContact Mechanics and Variational Inequalities
Stress-Based FEM in the Problem of Bending of Euler–Bernoulli and Timoshenko Beams Resting on Elastic Foundation | Litcius