On the stability of hybrid equilibrium and Trefftz finite element models for plate bending problems
Abstract
This paper is concerned with hybrid stress elements in the context of modelling the behaviour of plates subject to out of plane loading and based on Reissner-Mindlin assumptions. These elements are considered as equilibrium elements with statically admissible stress fields of which Trefftz fields form a special case. The existence of spurious kinematic modes in star patches of triangular elements is reviewed when boundary displacement fields are defined independently for each side. It is shown that for elements of moment degree > 1, the spurious modes for stars only exist at specific locations and/ or for certain configurations. The kinematic properties of these modes are used to define sufficient conditions for the stability of a complete mesh of triangular elements. A method is proposed to check mesh stability, and introduce local modifications to ensure overall stability.
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References
[1] B.M. Fraeijs de Veubeke. Displacement and equilibrium models in the finite element method. In: O.C. Zienkiewicz, G.S. Holister, eds., Stress Analysis, pp. 145-197. Wiley, New York, 1965.[2] J. Jirousek, A. Wróblewski, Q.H. Qin, Q. Hex. A family of quadrilateral hybrid-Trefftz p-elements for thick plate analysis. Computer Methods in Applied Mechanics and Engineering, 127: 315- 344, 1995.
[3] J. Jirousek, A.P. Zielinski. Dual hybrid-Trefftz element formulation based on independent boundary traction frame. International Journal for Numerical Methods in Engineering, 36: 2955-2980, 1993.
[4] E.A.W. Maunder. Hybrid equilibrium plate elements of high degree. Computer Assisted Mechanics and Engineering Sciences, 10: 531-543, 2003.
[5] E.A.W. Maunder, J.P. Moitinho de Almeida. A triangular hybrid equilibrium plate element of general degree. International Journal for Numerical Methods in Engineering, 63: 315-350, 2005.
[6] E.A.W. Maunder, J.P. Moitinho de Almeida. The stability of stars of triangular equilibrium plate elements. International Journal for Numerical Methods in Engineering, DOl: 10.1002/nme.2441, 2008.
[7] E.A.W. Maunder, J.P. Moitinho de Almeida, A.C.A. Ramsay. A general formulation of equilibrium macroelements with control of spurious kinematic modes. International Journal for Numerical Methods in Engineering, 39: 3175-3194, 1996.
[8] J.P. Moitinho de Almeida, J .A. Teixeira de Freitas. Alternative approach to the formulation of hybrid equilibrium finite elements. Computers and Structures, 40: 1043-1047, 1991.
[9] T.H.H. Pian. Derivation of element stiffness matrices by assumed stress distributions. AIAA Journal, 2: 1333-1335, 1964.
[10] J .A. Teixeira de Freitas. Formulation of elastostatic hybrid-Trefftz stress elements. Computer Methods in Applied Mechanics and Engineering, 153: 127-151, 1998.