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Peridynamic Analysis of Laminated Composite Plates Based on First-Order Shear Deformation Theory

Mehmet Dördüncü, Kadir KAYA, Ömer Faruk Ergin

2020International Journal of Applied Mechanics28 citationsDOI

Abstract

A nonlocal Peridynamic Differential Operator (PDDO) is presented for static analysis of laminated composite plates based on the First-order Shear Deformation Theory (FSDT). The equilibrium equations and boundary conditions of the FSDT were derived from the principle of virtual work. The local spatial derivatives in these equations were replaced with their nonlocal PD forms. The continuous transverse shear stresses were achieved by integrating the stress equilibrium equations through the thickness of the plate. This approach was validated against an existing analytical solution by considering a simply supported laminated composite plate under uniformly distributed sinusoidal load for different aspect ratios. The performance of this formulation was investigated by comparing through-the-thickness stress variations against the analytical solutions.

Topics & Concepts

Virtual workComposite numberMaterials scienceShear (geology)Boundary value problemTransverse shearPlate theoryStructural engineeringWork (physics)Deformation (meteorology)Stress (linguistics)Mathematical analysisComposite materialMechanicsFinite element methodPhysicsMathematicsEngineeringLinguisticsPhilosophyThermodynamicsNumerical methods in engineeringGeotechnical Engineering and Underground StructuresComposite Structure Analysis and Optimization
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