Research PapersNo Access

A more general model equation of nonlinear Rayleigh waves and their quasilinear solutions

Shuzeng Zhang

School of Traffic and Transportation Engineering, Central South University, Changsha, Hunan 410075, China

Search for more papers by this author

Xiongbing Li

School of Traffic and Transportation Engineering, Central South University, Changsha, Hunan 410075, China

E-mail Address: lixb_ex@163.com

Corresponding author.

Search for more papers by this author

, and

Hyunjo Jeong

Division of Mechanical and Automotive Engineering, Wonkwang University, Iksan, Jeonbuk 570-749, Republic of Korea

Search for more papers by this author

https://doi.org/10.1142/S0217984916500962Cited by:6 (Source: Crossref)

Abstract

A more general two-dimensional wave motion equation with consideration of attenuation and nonlinearity is proposed to describe propagating nonlinear Rayleigh waves of finite amplitude. Based on the quasilinear theory, the numerical solutions for the sound beams of fundamental and second harmonic waves are constructed with Green’s function method. Compared with solutions from the parabolic approximate equation, results from the general equation have more accuracy in both the near distance of the propagation direction and the far distance of the transverse direction, as quasiplane waves are used and non-paraxial Green’s functions are obtained. It is more effective to obtain the nonlinear Rayleigh sound beam distributions accurately with the proposed general equation and solutions. Brief consideration is given to the measurement of nonlinear parameter using nonlinear Rayleigh waves.

Keywords:

PACS: 05.90.+m, 43.25.Fe, 68.35.Iv

References

1. D. Torello, S. Thiele, K. H. Matlack, J. Kim, J. Qu and L. J. Jacobs, Ultrasonics 56 (2015) 417. Crossref, Web of Science, Google Scholar
2. S. V. Walker, J. Kim, J. Qu and L. J. Jacobs, NDT&E Int. 48 (2012) 10. Crossref, Web of Science, Google Scholar
3. E. A. Zabolotskaya, J. Acoust. Soc. Am. 91 (1992) 2569. Crossref, Web of Science, ADS, Google Scholar
4. D. J. Shull, M. F. Hamilton, Y. A. II’insky and E. A. Zabolotskaya, J. Acoust. Soc. Am. 94 (1993) 418. Crossref, Web of Science, ADS, Google Scholar
5. D. J. Shull, E. E. Kim, M. F. Hamilton and E. A. Zabolotskaya, J. Acoust. Soc. Am. 97 (1995) 2126. Crossref, Web of Science, ADS, Google Scholar
6. T. L. Szabo and A. J. Slobodnik, IEEE Trans. Sonics Ultrason. 20 (1973) 240. Crossref, Google Scholar
7. D. C. Hurley, J. Acoust. Soc. Am. 106 (1999) 1782. Crossref, Web of Science, ADS, Google Scholar
8. X. Zhao and T. Gang, Ultrasonics 49 (2009) 126. Crossref, Web of Science, Google Scholar
9. M. Cervenka and M. Bednarik, J. Acoust. Soc. Am. 134 (2013) 933. Crossref, Web of Science, ADS, Google Scholar
10. M. F. Hamilton and D. T. Blackstock, Nonlinear Acoustics (Academic Press, San Diego, 1998). Google Scholar
11. K. Watanabe, Integral Transform Techniques for Green’s Function (Springer, New York, 2014). Crossref, Google Scholar
12. S. Aanonsen, T. Barkve, J. N. Tjøtta and S. Tjøtta, J. Acoust. Soc. Am. 75 (1984) 749. Crossref, Web of Science, ADS, Google Scholar
13. A. C. Baker, B. Ward and V. F. Hunphrey, J. Acoust. Soc. Am. 100 (1996) 2062. Crossref, Web of Science, ADS, Google Scholar
14. J. Herrmann, J. Kim, L. J. Jacobs, J. Qu, J. W. Littles and M. F. Savage, J. Appl. Phys. 99 (2006) 124913. Crossref, Web of Science, ADS, Google Scholar
15. C. Pantea, C. F. Osterhoudt and D. N. Sinha, Ultrasonics 53 (2013) 1012. Crossref, Web of Science, Google Scholar
16. X. Li, Y. Song, P. Ni and F. Liu, Acta Metall. Sin. 51 (2015) 121. Web of Science, Google Scholar