Issue 52

J. Akbari et alii, Frattura ed Integrità Strutturale, 52 (2020) 269-280; DOI: 10.3221/IGF-ESIS.52.21 280 R EFERENCES [1] Doebling, S. W., Farrar, C. R., Prime, M. B., and Shevitz, D. W. (1996). Damage identification and health monitoring of structural and mechanical systems from changes in their vibration characteristics: a literature review (No. LA-13070-MS). Los Alamos National Lab., NM (United States). [2] Ratcliffe, C. P. (1997). Damage detection using a modified Laplacian operator on mode shape data. Journal of Sound and Vibration, 204(3), pp. 505-517. [3] Wang, Q., and Deng, X. (1999). Damage detection with spatial wavelets. International journal of solids and structures, 36(23), pp. 3443-3468. [4] Hou, Z., Noori, M., and Amand, R. S. (2000). Wavelet-based approach for structural damage detection. Journal of Engineering Mechanics, 126(7), pp. 677-683. [5] Chang, C. C., and Chen, L. W. (2003). Vibration damage detection of a Timoshenko beam by spatial wavelet based approach. Applied Acoustics, 64(12), pp. 1217-1240. [6] Ovanesova, A. V., and Suarez, L. E. (2004). Applications of wavelet transforms to damage detection in frame structures. Engineering structures, 26(1), pp. 39-49. [7] Loutridis, S., Douka, E., and Trochidis, A. (2004). Crack identification in double-cracked beams using wavelet analysis. Journal of sound and vibration, 277(4-5), pp. 1025-1039. [8] Chang, C. C., and Chen, L. W. (2005). Detection of the location and size of cracks in the multiple cracked beam by spatial wavelet based approach. Mechanical Systems and Signal Processing, 19(1), pp. 139-155. [9] Gökda ğ , H., and Kopmaz, O. (2009). A new damage detection approach for beam-type structures based on the combination of continuous and discrete wavelet transforms. Journal of Sound and Vibration, 324(3-5), pp. 1158-1180. [10]Rucka, M. (2011). Damage detection in beams using wavelet transform on higher vibration modes. Journal of theoretical and applied mechanics, 49(2), pp. 399-417. [11]Zhong, S., and Oyadiji, S. O. (2011). Detection of cracks in simply-supported beams by continuous wavelet transform of reconstructed modal data. Computers and structures, 89(1-2), pp. 127-148. [12]Zhong, S., and Oyadiji, S. O. (2011). Crack detection in simply supported beams using stationary wavelet transform of modal data. Structural Control and Health Monitoring, 18(2), pp. 169-190. [13]Algaba, M., Solís, M., and Galvín, P. (2012). Wavelet based mode shape analysis for damage detection. In Topics in Modal Analysis II, Springer, New York, NY., 6, pp. 377-384. [14]Solís, M., Algaba, M., and Galvín, P. (2013). Continuous wavelet analysis of mode shapes differences for damage detection. Mechanical Systems and Signal Processing, 40(2), pp. 645-666. [15]Khorram, A., Rezaeian, M., and Bakhtiari-Nejad, F. (2013). Multiple cracks detection in a beam subjected to a moving load using wavelet analysis combined with factorial design. European Journal of Mechanics- A/Solids, 40, pp. 97-113. [16]Cao, M., Radzie ń ski, M., Xu, W., and Ostachowicz, W. (2014). Identification of multiple damage in beams based on robust curvature mode shapes. Mechanical Systems and Signal Processing, 46(2), pp. 468-480. [17]Cao, M., Xu, W., Ostachowicz, W., and Su, Z. (2014). Damage identification for beams in noisy conditions based on Teager energy operator-wavelet transform modal curvature. Journal of Sound and Vibration, 333(6), pp. 1543-1553. [18]Akbari.J, Ahmadifarid.M (2018), Damage Detection of frames using Wavelet Transforms and Signal Energy, 7th National and 3rd International Conference on Modern Materials and Structures in Civil Engineering, Bu- Ali Sina University, Hamedan, Iran, September 8-9. [19]MATLAB (2018), The MathWorks, Inc., Natick, Release 2018a [20]Blatter, C. (2018). Wavelets: a primer. AK Peters/CRC Press.