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http://dx.doi.org/10.12989/csm.2022.11.2.167

Instability of (Heterogeneous) Euler beam: Deterministic vs. stochastic reduced model approach  

Ibrahimbegovic, Adnan (Chair of Computational Mechanics, Universite de Technologie Compiegne)
Mejia-Nava, Rosa Adela (Chair of Computational Mechanics, Universite de Technologie Compiegne)
Hajdo, Emina (Faculty of Civil Engineering, University of Sarajevo)
Limnios, Nikolaos (Universite de Technologie Compiegne, LMAC)
Publication Information
Coupled systems mechanics / v.11, no.2, 2022 , pp. 167-198 More about this Journal
Abstract
In this paper we deal with classical instability problems of heterogeneous Euler beam under conservative loading. It is chosen as the model problem to systematically present several possible solution methods from simplest deterministic to more complex stochastic approach, both of which that can handle more complex engineering problems. We first present classical analytic solution along with rigorous definition of the classical Euler buckling problem starting from homogeneous beam with either simplified linearized theory or the most general geometrically exact beam theory. We then present the numerical solution to this problem by using reduced model constructed by discrete approximation based upon the weak form of the instability problem featuring von Karman (virtual) strain combined with the finite element method. We explain how such numerical approach can easily be adapted to solving instability problems much more complex than classical Euler's beam and in particular for heterogeneous beam, where analytic solution is not readily available. We finally present the stochastic approach making use of the Duffing oscillator, as the corresponding reduced model for heterogeneous Euler's beam within the dynamics framework. We show that such an approach allows computing probability density function quantifying all possible solutions to this instability problem. We conclude that increased computational cost of the stochastic framework is more than compensated by its ability to take into account beam material heterogeneities described in terms of fast oscillating stochastic process, which is typical of time evolution of internal variables describing plasticity and damage.
Keywords
duffing oscillator; Euler beam; instability problem; stochastic approach; von Karman strain;
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Times Cited By KSCI : 8  (Citation Analysis)
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1 Timoshenko, S. and Gere, J.M. (1961), Theory of Elastic Stability, McGraw Hill.
2 Hajdo, E., Mejia-Nava, R.A., Imamovic, I. and Ibrahimbegovic, A. (2021), "Linearized instability analysis of frame structures under non-conservative loads: Static and dynamic approach", Couple. Syst. Mech., 10, 79-102. https://doi.org/10.12989/csm.2021.10.1.079.   DOI
3 Ibrahimbegovic, A. (2009), Nonlinear Solid Mechanics: Theoretical Formulations and Finite Element Solution Methods, Springer, Berlin, Germany.
4 Dujc, J., Brank, B. and Ibrahimbegovic, A. (2010), "Multi-scale computational model for failure analysis of metal frames that includes softening and local buckling", Comput. Meth. Appl. Mech. Eng., 199(21-22), 1371-1385. https://doi.org/10.1016/j.cma.2009.09.003.   DOI
5 Liptser, R. and Shiryayev, A.N. (2012), Theory of Martingales, Vol. 49, Springer.
6 Arnold, L. (1974), Stochastic Differential Equations: Theory and Applications, John Wiley.
7 Cai, G.Q. and Lin, Y.K. (1988), "On exact stationary solutions of equivalent non-linear stochastic systems", Int. J. Nonlin. Mech., 23(4), 315-325.   DOI
8 Clough, R.W. and Penzien, J. (2006), Dynamics of Structures, MsGraw-Hill.
9 Culver, D., McHugh, K.A. and Dowell, E.H. (2019), "An assessment and extension of geometrically nonlinear beam theories", Mech. Syst. Signal Pr., 134, 106340. https://doi.org/10.1016/j.ymssp.2019.106340.   DOI
10 Ethier, S.N and Kurtz, T.G. (2009), Markov Processes: Characterization and Convergence, Vol. 282, John Wiley & Sons.
11 Ibrahimbegovic, A. and Mamouri, S. (1999), "Nonlinear dynamics of flexible beams in planar motion: Formulation and time-stepping scheme for stiff problems", J. Comput. Struct., 70, 1-21. https://doi.org/10.1016/S0045-7949(98)00150-3.   DOI
12 Gasparini, A.M., Saetta, A.V. and Vitaliani, R.V. (1995), "On the stability and instability regions of nonconservative continuous system under partially follower forces", Comput. Meth. Appl. Mech. Eng., 124, 63-78. https://doi.org/10.1016/0045-7825(94)00756-D.   DOI
13 Hajdo, E., Ibrahimbegovic, A. and Dolarevic, S. (2020), "Buckling analysis of complex structures with refined model built of frame and shell finite elements", Couple. Syst. Mech., 9, 29-46. http://doi.org/10.12989/csm.2020.9.1.029.   DOI
14 Ibrahimbegovic, A. (1997), "On the choice of finite rotation parameters", Comput. Meth. Appl. Mech. Eng., 149, 49-71. https://doi.org/10.1016/S0045-7825(97)00059-5.   DOI
15 Ibrahimbegovic, A. and Taylor, R.L. (2002), "On the role of frame-invariance of structural mechanics models at finite rotations", Comput. Meth. Appl. Mech. Eng., 191, 5159-5176. https://doi.org/10.1016/S0045-7825(02)00442-5.   DOI
16 Guckenheimer, J. and Holmes, Ph.J. (2013), Nonlinear Oscillations, Dynamical Systems, and Bifurcations of Vector Fields, Vol. 42, Springer.
17 Ibrahimbegovic, A. (1995), "On FE implementation of geometrically nonlinear Reissner's beam theory: Three-dimensional curved beam elements", Comput. Meth. Appl. Mech. Eng., 122, 11-26.   DOI
18 Ibrahmbegovic, A. and Mejia-Nava, R.A. (2021), "Heterogeneities and material-scales providing physically based damping to replace Rayleigh damping for any structure size", Couple. Syst. Mech., 10, 201-216, http://doi.org/10.12989/csm.2021.10.3.201.   DOI
19 Ibrahimbegovic, A. and Al Mikdad, M. (1998), "Finite rotations in dynamics of beams and implicit timestepping schemes", Int. J. Numer. Meth. Eng., 41, 781-814. https://doi.org/10.1002/(SICI)1097-0207(19980315)41:5<781::AID-NME308>3.0.CO;2-9.   DOI
20 Ibrahimbegovic, A., Hajdo, E. and Dolarevic, S. (2013), "Linear instability or buckling problems for mechanical and coupled thermomechanical extreme conditions", Couple. Syst. Mech., 2, 349-374. http://doi.org/10.12989/csm.2013.2.4.349.   DOI
21 Imamovic, I., Ibrahimbegovic, A. and Hajdo, E. (2019), "Geometrically exact initially curved Kirchhoff's planar elasto-plastic beam", Couple. Syst. Mech., 8, 537-553. https://doi.org/10.12989/csm.2019.8.6.537.   DOI
22 Kree, P. and Soize, Ch. (2012), Mathematics of Random Phenomena: Random Vibrations of Mechanical Structures, Vol. 32, Springer Science & Business Media.
23 Lozano, R., Brogliato, B., Egeland, O. and Maschke, B. (2000), Dissipative Systems Analysis and Control: Theory and Applications, Springer.
24 Mejia-Nava, A.R., Ibrahimbegovic, A. and Lozano, R. (2020), "Instability phenomena and their control in statics and dynamics: Application to deep and shallow truss and frame structure", Couple. Syst. Mech., 9, 47-62. http://doi.org/10.12989/csm.2020.9.1.047.   DOI
25 Mejia-Nava, A.R., Imamovic, I., Hajdo, E. and Ibrahimbegovic, A. (2022), "Nonlinear instability problem for geometrically exact beam under conservative and non-conservative loads", Eng. Struct. (in Press)
26 Moreno-Navarro, P., Ibrahimbegovic, A. and Damjanovic, D. (2021), "Multi-scale model for coupled piezoelectric-inelastic behavior", Couple. Syst. Mech., 10(6), 521-544. https://doi.org/10.12989/csm.2021.10.6.521.   DOI
27 Parlett, B.N. (1980), The Symmetric Eigenvalue Problem, Prentice-Hall.
28 Khasminskii, R. (2011), Stochastic Stability of Differential Equations, Vol. 66, Springer.
29 Masjedi, P.K. and Ovesy, H.R. (2015), "Large deflection analysis of geometrically exact spatial beams under conservative and nonconservative loads using intrinsic equation", Acta Mechanica, 226, 1689-1706. https://doi.org/10.1007/s00707-014-1281-3.   DOI
30 Medic, S., Dolarevic, S. and Ibrahimbegovic, A. (2013), "Beam model refinement and reduction", Eng. Struct., 50, 158-169. https://doi.org/10.1016/j.engstruct.2012.10.004.   DOI