Geometrically nonlinear vibrations of thin visco-elastic periodic plates on a foundation with damping: non-asymptotic modelling

• Autorzy: Jędrysiak J.

Identyfikatory

DOI

10.15632/jtam-pl.54.3.945

• Języki publikacji: EN

Abstrakty

EN

The objects under consideration are thin visco-elastic periodic plates with moderately large deflections. Geometrically nonlinear vibrations of these plates are investigated. In order to take into account the effect of microstructure size on behaviour of these plates a non- -asymptotic modelling method is proposed. Using this method, called the tolerance modelling, model equations with constant coefficients involving terms dependent on the microstructure size can be derived. In this paper, only theoretical considerations of the problem of nonlinear vibrations of thin visco-elastic periodic plates resting on a foundation with damping are presented.

Słowa kluczowe

EN

thin visco-elastic periodic plates; nonlinear vibrations; effect of microstructure size; analytical tolerance modelling

• Wydawca: Polskie Towarzystwo Mechaniki Teoretycznej i Stosowanej
• Czasopismo: Journal of Theoretical and Applied Mechanics
• Rocznik: 2016
• Tom: Vol. 54 nr 3
• Strony: 945--961
• Opis fizyczny: Bibliogr. 53 poz., rys.

Twórcy

autor

Jędrysiak J.

• Lodz University of Technology, Department of Structural Mechanics, Łódź, Poland

Bibliografia

• 1. Awrejcewicz J., Kurpa L., Shmatko T., 2013, Large amplitude free vibration of orthotropic shallow shells of complex shapes with variable thickness, Latin American Journal of Solids and Structures, 10, 149-162
• 2. Brito-Santana H., Wang Y.S., Rodrguez-Ramos R., Bravo-Castillero J., GuinovartD´ıaz R., Volnei Tita, 2015, A dispersive nonlocal model for shear wave propagation in laminated composites with periodic structures, European Journal of Mechanics – A/Solids, 49, 35-48
• 3. Camier C., Touz´e C., Thomas O., 2009, Non-linear vibrations of imperfect free-edge circular plates and shells, European Journal of Mechanics – A/Solids, 28, 500-515
• 4. Dallot J., Sab K., Foret G., 2009, Limit analysis of periodic beams, European Journal of Mechanics – A/Solids, 28, 166-178
• 5. De Carvalho N.V., Pinho S.T., Robinson P., 2011, Reducing the domain in the mechanical analysis of periodic structures, with application to woven composites, Composites Science and Technology, 71, 969-979
• 6. Domagalski Ł., Jędrysiak J., 2012, On the elastostatics of thin periodic plates with large deflections, Meccanica, 41, 1659-1671
• 7. Domagalski Ł., Jędrysiak J., 2014, Nonlinear vibrations of periodic beams, Journal of Vibrations in Physical Systems, 26, 73-78
• 8. Domagalski Ł., Jędrysiak J., 2015, On the tolerance modelling of geometrically nonlinear thin periodic plates, Thin-Walled Structures, 87, 183-190
• 9. Fallah A., Aghdam M.M., 2011, Nonlinear free vibration and post-buckling analysis of functionally graded beams on nonlinear elastic foundation, European Journal of Mechanics – A/Solids, 30, 571-583
• 10. Golmakani M.E., Alamatian J., 2013, Large deflection analysis of shear deformable radially functionally graded sector plates on two-parameter elastic foundations, European Journal of Mechanics – A/Solids, 42, 251-265
• 11. Gupta A.K., Khanna A., Gupta D.V., 2009, Free vibration of clamped visco-elastic rectangular plate having bi-direction exponentially thickness variations, Journal of Theoretical and Applied Mechanics, 47, 2, 457-471
• 12. He W.M., Chen W.Q., Qiao H., 2013, Two-scale analytical solutions of multilayered composite rectangular plates with in-plane small periodic structure, European Journal of Mechanics – A/Solids, 40, 123-130
• 13. Houmat A., 2013, Nonlinear free vibration of laminated composite rectangular plates with curvilinear fibers, Composites Structures, 106, 211-224
• 14. Huang J.Y., 2004, Uniformly valid asymptotic solutions of the nonlinear unsymmetrical bending for orthotropic rectangular thin plate of four clamped edges with variable thickness, Applied Mathematics and Mechanics, 25, 817-826
• 15. Jasion P., Magnucka-Blandzi E., Szyc W., Magnucki K., 2012, Global and local buckling of sandwich circular and beam-rectangular plates with metal foam core, Thin-Walled Structures, 61, 154-161
• 16. Jędrysiak J., 2000, On the stability of thin periodic plates, European Journal of Mechanics – A/Solids, 19, 3, 487-502
• 17. Jędrysiak J., 2003, Free vibrations of thin periodic plates interacting with an elastic periodic foundation, International Journal of Mechanical Sciences, 45, 8, 1411-1428
• 18. Jędrysiak J., 2009, Higher order vibrations of thin periodic plates, Thin-Walled Structures, 47, 890-901
• 19. Jędrysiak J., 2013, Modelling of dynamic behaviour of microstructured thin functionally graded plates, Thin-Walled Structures, 71, 102-107
• 20. Jędrysiak J., Michalak B., 2011, On the modelling of stability problems for thin plates with functionally graded structure, Thin-Walled Structures, 49, 627-635
• 21. Jędrysiak J., Paś A., 2014, Dynamics of medium thickness plates interacting with a periodic Winkler’s foundation: non-asymptotic tolerance modelling, Meccanica, 49, 1577-1585
• 22. Kaźmierczak M., Jędrysiak J., 2011, Tolerance modelling of vibrations of thin functionally graded plates, Thin-Walled Structures, 49, 1295-1303
• 23. Kohn R.V., Vogelius M., 1984, A new model of thin plates with rapidly varying thickness, International Journal of Solids and Structures, 20, 333-350
• 24. Królak M., Kowal-Michalska K., Mania R.J., Świniarski J., 2009, Stability and load carrying capacity of multi-cell thin-walled columns of rectangular cross-sections, Journal of Theoretical and Applied Mechanics, 47, 1, 435-456
• 25. Lei Y., Murmu T., Adhikari S., Friswell M.I., 2013, Dynamic characteristics of damped viscoelastic nonlocal Euler-Bernoulli beams, European Journal of Mechanics – A/Solids, 42, 125- 136
• 26. Levy S., 1942, Bending of rectangular plates with large deflections, NACA Rep No. 737. NACA Tech Note No. 846
• 27. Lurie S.A., Belov P.A., Tuchkova N.P., 2005, The application of the multiscale models for description of the dispersed composites, Composites Part A: Applied Science and Manufacturing, 36, 2, 145-152
• 28. Magnucka-Blandzi E., 2010, Non-linear analysis of dynamic stability of metal foam circular plate, Journal of Theoretical and Applied Mechanics, 48, 1, 207-217
• 29. Mahmoudkhani S., Haddadpour H., Navazi H.M., 2014, The effects of nonlinearities on the vibration of viscoelastic sandwich plates, nternational Journal of Non-Linear Mechanics, 62, 41-57
• 30. Manevich A., Kołakowski Z., 2011, Free and forced oscillations of Timoshenko beam made of viscoelastic material, Journal of Theoretical and Applied Mechanics, 49, 1, 3-16
• 31. Marczak J., Jędrysiak J., 2014, Analysis of vibrations of plate strip with concentrated masses using tolerance averaging technique, Journal of Vibrations in Physical Systems, 26, 161-168
• 32. Matysiak S.J., Perkowski D.M., 2014, Temperature distributions in a periodically stratified layer with slant lamination, Heat Mass Transfer, 50, 75-83
• 33. Meenen J., Altenbach H., 2001, A consistent deduction of von K´arm´an-type plate theories from three-dimensional nonlinear continuum mechanics, Acta Mechanica, 147, 1-17
• 34. Michalak B., 2001, The meso-shape functions for the meso-structural models of wavy-plates, ZAMM, 81, 639-641
• 35. Nagórko W., Woźniak C., 2002, Nonasymptotic modelling of thin plates reinforced by a system of stiffeners, Electronic Journal of Polish Agricultural Universities – Civil Engineering, 5, 2
• 36. Perliński W., Gajdzicki M., Michalak B., 2014, Modelling of annular plates stability with functionally graded structure interacting with elastic heterogeneous subsoil, Journal of Theoretical and Applied Mechanics, 52, 2, 485-498
• 37. Reinhall P.G., Miles R.N., 1989, Effect of damping and stiffness on the random vibration of non-linear periodic plates, Journal of Sound and Vibration, 132, 33-42
• 38. Saha G.C., Kalamkarov A.L., Georgiades A.V., 2007, Effective elastic characteristics of honeycomb sandwich composite shells made of generally orthotropic materials, Composites Part A: Applied Science and Manufacturing, 38, 6, 1533-1546
• 39. Schmitz A., Horst P., 2014, A finite element unit-cell method for homogenised mechanical properties of heterogeneous plates, Composites Part A: Applied Science and Manufacturing, 61, 23-32
• 40. Singha M.K., Rupesh Daripa, 2009, Nonlinear vibration and dynamic stability analysis of composite plates, Journal of Sound and Vibration, 328, 541-554
• 41. Teter A., 2011, Dynamic critical load based on different stability criteria for coupled buckling of columns with stiffened open cross-sections, Thin-Walled Structures, 49, 589-595
• 42. Timoshenko S., Woinowsky-Krieger S., 1959, Theory of Plates and Shells, McGraw-Hill, New York
• 43. Tomczyk B., 2007, A non-asymptotic model for the stability analysis of thin biperiodic cylindrical shells, Thin-Walled Structures, 45, 941-944
• 44. Vlasov W.Z., Leontiev N.N., 1960, Beams, Plates and Shells on Rigid Subsoil (in Russian), Gos. Izd. Fiz.-Mat. Lit., Moskva
• 45. Wierzbicki E., Woźniak C., 2000, On the dynamics of combined plane periodic structures, Archive of Applied Mechanics, 70, 6, 387-398
• 46. Wierzbicki E., Woźniak C., Woźniak M., 2001, On the modelling of transient micro-motions and near-boundary phenomena in a stratified elastic layer, International Journal of Engineering Science, 39, 13, 1429-1441
• 47. Woźniak C. (edit.), 2001, Mechanics of Elastic Plates and Shells (in Polish), PWN, Warsaw
• 48. Woźniak C., et al. (edit.), 2010, Mathematical Modelling and Analysis in Continuum Mechanics of Microstructured Media, Silesian Techn. Univ. Press, Gliwice
• 49. Woźniak C., Michalak B., Jędrysiak J. (edit.), 2008, Thermomechanics of Microheterogeneous Solids and Structures. Tolerance Averaging Approach, Lodz Univ. Techn. Press, Lodz
• 50. Yajuvindra Kumar, Lal R., 2013, Prediction of frequencies of free axisymmetric vibration of two-directional functionally graded annular plates on Winkler foundation, European Journal of Mechanics – A/Solids, 42, 219-228
• 51. Yaghoobi H., Torabi M., 2013, An analytical approach to large amplitude vibration and postbuckling of functionally graded beams rest on non-linear elastic foundation, Journal of Theoretical and Applied Mechanics, 51, 1, 39-52
• 52. Youzera H., Meftah S.A., Challamel N., Tounsi A., 2012, Nonlinear damping and forced vibration analysis of laminated composite beams, Composites Part B: Engineering, 43, 1147-1154
• 53. Zhou X.Q., Yu D.Y., Shao X., Wang S., Tian Y.H., 2014, Band gap characteristics of periodically stiffened-thin-plate based on center-finite-difference-method, Thin-Walled Structures, 82, 115-123

Uwagi

PL

Opracowanie ze środków MNiSW w ramach umowy 812/P-DUN/2016 na działalność upowszechniajacą naukę.