Identyfikatory
Warianty tytułu
Języki publikacji
Abstrakty
The current work is devoted to the problem of analytical and numerical identification of fundamental elastic waves' modes, namely symmetric mode S0 and antisymmetric mode A0, in the case of hybrid composite. The investigated material consists of one layer made of aluminum alloy Pa38 and six layers made of glass fabric/epoxy resin. At the very beginning, the dispersion curves are determined with the use of stiffness matrix method. The calculated values of phase velocities are verified by numerical simulation. The semi – analytical finite element method is applied. Next, the numerical simulations of elastic waves propagation are performed. In the studied model, the plane state of strain is assumed. These simulations are carried out with the use of finite element method. The excitation signal is a sine wave modulated by Hanning window. The simulation is repeated for different excitation frequency. The group velocities of wave modes S0 and A0 are estimated and compared with the analytical results. The evaluation of the group velocities is based on the analysis of the appropriate components of displacement. The two different method are employed, namely: cross – correlation method and envelope extraction by Hilbert transform. Generally, the obtained results are in a good agreement. However, the method based on envelope extraction by Hilbert transform provides better correlation between analytical and numerical results. The significant discrepancy is observed in the case of symmetric mode S0 for relatively high values of frequency. It is caused by the dispersion phenomena. The analytical calculations are performed with the use of SCILAB 5.5.2 free software and the numerical simulations are carried out with the use of finite element system ANSYS 13.0.
Wydawca
Czasopismo
Rocznik
Tom
Strony
31--38
Opis fizyczny
Bibliogr. 21 poz., rys.
Twórcy
autor
- Cracow University of Technology, Department of Mechanical Engineering Jana Pawła II Av. 37, 31 – 864 Krakow, Poland tel.: +48 12 628 33 89, fax. +48 12 628 33 60
autor
- Cracow University of Technology, Department of Mechanical Engineering Jana Pawła II Av. 37, 31 – 864 Krakow, Poland tel.: +48 12 628 36 21, fax. +48 12 628 33 60
Bibliografia
- [1] Ostachowicz, W., Güemes, A., New Trends in Structural Health Monitoring, Springer, Vol. 542, 2013.
- [2] Giurgiutiu, V., Structural Health Monitoring with Piezoelectric Wafer Active Sensors, Elsevier, 2008.
- [3] Thompson, W. T., Transmission of elastic waves through a stratified solid medium, Journal of Applied Physics, Vol. 21, pp. 89-93, 1950.
- [4] Haskell, N. A., Dispersion of surface waves on multi-layered media, Bulletin of Seismological Society of America, Vol. 43, pp. 17 – 34, 1953.
- [5] Nayfeh, A. H., The general problem of elastic wave propagation in multi-layered anisotropic media, Journal of Acoustic Society of America, Vol. 89(4), pp. 1521-1531, 1991.
- [6] Lowe, J. S., Matrix Techniques for Modeling Ultrasonic Waves in Multilayered Media, IEEE Transactions on Ultrasonics, Ferroelectric and frequency Control, Vol. 42(2), pp. 525-542, 1995.
- [7] Knopoff, L., A matrix method for elastic waves problems, Bulletin of Seismological Society of America, Vol. 43, pp. 431-438, 1964.
- [8] Kausel, E., Wave propagation in anisotropic media, International Journal for Numerical Methods in Engineering, Vol. 23, pp. 1567-1578, 1986.
- [9] Wang, L., Rokhlin, S. I., Stable reformulation of transfer matrix method in layered anisotropic media, Ultrasonics, Vol. 39, pp. 413-424, 2001.
- [10] Rokhlin, S. I., Wang, L., Stable recursive algorithm for elastic wave propagation in layered anisotropic media: Stiffness matrix method, Journal of Acoustic Society of America, Vol. 112, pp. 822-834, 2002.
- [11] Karmazin, A., Kirillova, E., Seemann, W., Syromyatnikov, P., Investigation of Lamb elastic waves in anisotropic multi-layered composites applying the Green's matrix, Ultrasonics, Vol. 51, pp. 17-28, 2011.
- [12] Cunfu H., Hongye, L., Zenghua, L., Bin, W., The propagation of coupled Lamb waves in multi-layered arbitrary anisotropic composite laminates, Journal of Sound and Vibration, Vol. 332, pp. 7243-7256, 2013.
- [13] Ma, Z., Chen, J., Li, B., , Li, Z., Su X., Dispersion analysis of Lamb waves in composite laminates based on reverberation-ray matrix method, Composite Structure, Vol. 136, pp. 419-429, 2016.
- [14] Castaings, M., Hosten, B., Lamb and SH waves generated and detected by air-coupled ultrasonic transducers in composite material plates, NDT&E International, Vol. 34, pp. 249-258, 2001.
- [15] Harb, M. S, Yuan, F. G., Non-contact ultrasonic technique for Lamb wave characterization in composite plate, Ultrasonics, Vol. 64, pp. 162-169, 2016.
- [16] Wang, L., Yuan, F. G., Group velocity and characteristic wave curves of Lamb waves in composites: Modeling and experiments, Composites Science and Technology, Vol. 67, pp. 1370-1384, 2007.
- [17] Pant, S., Laliberte, J., Martinez, M., Rocha, B., Derivation and experimental validation of Lamb wave equations for an n – layered anisotropic composite laminate, Composite Structure, Vol. 111, pp. 566-579, 2014.
- [18] Rhee, S. H., Ki, Lee, J., Lee J. J., The group velocity variation of Lamb wave in fiber reinforced composite plate, Ultrasonics, Vol. 47, pp. 55-63, 2007.
- [19] Xu, B., Yu, L., Giurgiutiu, V., Advanced Methods for Time-Of-Flight Estimation with Application to Lamb Wave Structural Health Monitoring, Proceedings of the 7th International Workshop on Structural Health Monitoring, Stanford University, Palo Alto, CA, 2009.
- [20] Sorohan, S., Constantin, N., Gavan, M., Anghel, V., Extraction of dispersion curves for waves propagating in free complex waveguides by standard finite element codes, Ultrasonics, Vol. 51, pp. 503-515, 2011.
- [21] Help system, ANSYS13.0 Release. 38
Uwagi
PL
Opracowanie ze środków MNiSW w ramach umowy 812/P-DUN/2016 na działalność upowszechniającą naukę (zadania 2017).
Typ dokumentu
Bibliografia
Identyfikator YADDA
bwmeta1.element.baztech-e348393c-4447-4f89-b074-bf67c79b95c2