Advanced search
Publication Cover
Mechanics of Advanced Materials and Structures Volume 26, 2019 - Issue 5
Submit an article Journal homepage
159
Views
10
CrossRef citations to date
0
Altmetric
Original Articles

Shear waves in magneto-elastic transversely isotropic (MTI) layer bonded between two heterogeneous elastic media

Santimoy KunduDepartment of Applied Mathematics, Indian Institute of Technology (Indian School of Mines), Dhanbad, Jharkhand, India
,
Parvez AlamDepartment of Applied Mathematics, Indian Institute of Technology (Indian School of Mines), Dhanbad, Jharkhand, IndiaCorrespondence[email protected]
&
Shishir GuptaDepartment of Applied Mathematics, Indian Institute of Technology (Indian School of Mines), Dhanbad, Jharkhand, India
Pages 407-415 | Received 09 Sep 2016, Accepted 15 Jul 2017, Published online: 19 Dec 2017

References

  • A. K. Singh, N. Kumari, A. Chattopadhyay, and S. A. Sahu, “Smooth moving punch in an initially stressed transversely isotropic magnetoelastic medium due to shear wave,” Mecha. Advanc. Mater. Struct., vol. 23, no. 7, pp. 774–783, 2016.
  • A. Khojasteh, M. Rahimian, M. Eskandari, and R. Y. S. Pak, “Asymmetric wave propagation in a transversely isotropic half-space in displacement potentials,” Int. Journ. Eng. Sc., vol. 46, no. 7, pp. 690–710, 2008.
  • Y. Pang, J. X. Liu, Y. S. Wang, and X. F. Zhao, “Propagation of Rayleigh-type surface waves in a transversely isotropic piezoelectric layer on a piezomagnetic half-space,” J. Appl. Phy., vol. 103, no. 7, pp. 074901, 2008.
  • B. Singh, “Wave propagation in a rotating transversely isotropic two-temperature generalized thermoelastic medium without dissipation,” Int. Journ. Thermophy., vol. 37, no. 1, pp. 1–13, 2016.
  • D. P. Acharya, I. Roy, and S. Sengupta, “Effect of magnetic field and initial stress on the propagation of interface waves in transversely isotropic perfectly conducting media,” Acta. Mech., vol. 202, pp. 35–45, 2009.
  • A. K. Singh, K. C. Mistri, T. Kaur, and A. Chattopadhyay, “Effect of undulation on SH-wave propagation in corrugated magneto-elastic transversely isotropic layer,” Mecha. Advanc. Mater. Struct., vol. 24, no. 3, pp. 200–211, 2015.
  • Y. Jiangong and M. Qiujuan, “Wave characteristics in magneto-electro-elastic functionally graded spherical curved plates,” Mecha. Advanc. Mater. Struct., vol. 17, no. 4, pp. 287–301, 2010.
  • M. I. Othman and S. M. Said, “The effect of rotation on a fiber-reinforced medium under generalized magneto-thermoelasticity with internal heat source,” Mecha. Advanc. Mater. Struct., vol. 22, no. 3, pp. 168–183, 2015.
  • M. A. Ezzat and M. A. Fayik, “Magneto-thermo-viscoelastic medium associated with Wiedemann–Franz law,” Mecha. Advanc. Mater. Struct., vol. 21, no. 10, pp. 824–835, 2014.
  • A. Chattopadhyay and A. K. Singh, “Propagation of magnetoelastic shear waves in an irregular self-reinforced layer,” Jour. Engin. Mathem., vol. 75, no. 1, pp. 139–155, 2012.
  • A. M. Abd-Alla, S. M. Abo-Dahab, and A. A. Kilany, “SV-waves incidence at interface between solid-liquid media under electromagnetic field and initial stress in the context of three thermoelastic theories,” J. Therm. Stre., vol. 39, no. 8, pp. 960–976, 2016.
  • S. M. Said, “Influence of gravity on generalized magneto-thermoelastic medium for three-phase-lag model,” J. Comput. Ppl. Math., vol. 291, pp. 142–157, 2016.
  • S. R. Mahmoud, “An analytical solution for the effect of initial stress, rotation, magnetic field and a periodic loading in a thermo-viscoelastic medium with a spherical cavity,” Mech. Adva. Mater. Struct., vol. 23, no. 1, pp. 1–7, 2016.
  • S. M. Abo-Dahab, “On magnetic field and two thermal relaxation times for p-waves propagation at interface between two solid liquid media under initial stress and heat sources,” J. Compu. Theor. Nanosc., vol. 12, no. 3, pp. 361–370, 2015.
  • A. K. Singh, S. Kumar, and A. Chattopadhyay, “Effect of smooth moving punch in an initially stressed monoclinic magnetoelastic crystalline medium due to shear wave propagation,” J. Vibr. Cont., vol. 22, no. 11, pp. 2719–2730, 2016.
  • S. Majhi, P. C. Pal, and S. Kumar, “Reflection and transmission of plane SH-waves in an initially stressed inhomogeneous anisotropic magnetoelastic medium,” J. Seism., vol. 21, no. 1, pp. 155–163, 2017.
  • S. K. Vishwakarma and R. Xu, “G-type dispersion equation under suppressed rigid boundary: analytic approach,” Appl. Mathe. Mech., vol. 37, no. 4, pp. 501–512, 2016.
  • S. Kundu, P. Alam, S. Gupta, and D. K. Pandit, “Impacts on the propagation of SH-waves in a heterogeneous viscoelastic layer sandwiched between an anisotropic porous layer and an initially stressed isotropic half-space,” J. Mech., vol. 33, no. 1, pp. 13–22, 2017.
  • S. A. Sahu, P. K. Saroj, and N. Dewangan, “SH-waves in viscoelastic heterogeneous layer over half-space with self-weight,” Arch. Appl. Mech., vol. 84, pp. 235–245, 2014.
  • P. Kumari, V. K. Sharma, and C. Modi, “Propagation of torsional waves in an inhomogeneous layer sandwiched between inhomogeneous semi-infinite strata,” Journ. Engin. Mathem., vol. 90, no. 1, pp. 1–11, 2015.
  • S. Manna, S. Kundu, and S. Gupta, “Love wave propagation in a piezoelectric layer overlying in an inhomogeneous elastic half-space,” Journ. Vibr. Cont., vol. 21, no. 13, pp. 2553–2568, 2015.
  • S. Manna, S. Kundu, and S. Gupta, “Propagation of Love type wave in piezoelectric layer overlying non-homogeneous half-space,” Electr. Jour. Mathem. Technol., vol. 8, no. 1, pp. 1–17, 2014.
  • S. Manna, S. Kundu, and S. Gupta, “Effect of reinforcement and inhomogeneity on the propagation of love waves,” Internat. Journ. Geome., vol. 16, no. 2, pp. 04015045, 2015.
  • K. E. Bullen, “The problem of the Earth’s density variation,” Bull. Seismol. Soc. Am., vol. 30, no. 3, pp. 235–250, 1940.
  • Z. Hong, Z. Ligang, H. Jiecai, and Z. Yumin, “Love wave in an isotropic homogeneous elastic half-space with a functionally graded cap layer,” App. Math. Comp., vol. 231, pp. 93–99, 2014.
  • S. Gupta and S. K. Vishwakarma, “Propagation of P-and S-waves in initially stressed gravitating half-space,” App. Math. Mech., vol. 34, pp. 847–860, 2013.
  • C. H. Daros, “Green’s function for SH-waves in inhomogeneous anisotropic elastic solid with power-function velocity variation,” Wave Motion, vol. 50, pp. 101–110, 2013.
  • P. Kumari, V. K. Sharma, and C. Modi, “Modeling of magnetoelastic shear waves due to point source in a viscoelastic crustal layer over an inhomogeneous viscoelastic half-space,” Waves Rand. Compl. Med., vol. 26, pp. 101–120, 2016.
  • M. A. Biot, Mechanics of Incremental Deformation. New York: Wiley, 1965.
  • E. T. Whittaker and G. N. Watson, A Course of Modern Analysis. New Delhi: Universal Book Stall, 1990.
  • A. E. H. Love, Mathematical Theory of Elasticity. Cambridge: Cambridge University Press, 1920.
  • R. G. Payton, Elastic wave Propagation in transversely isotropic media, vol. 4. Boston: Martinus Nijhoff, 1983.
  • D. Gubbins, Seismology and Plate Tectonics. Cambridge: Cambridge University Press, 1990.

Reprints and Corporate Permissions

Please note: Selecting permissions does not provide access to the full text of the article, please see our help page How do I view content?

To request a reprint or corporate permissions for this article, please click on the relevant link below:

Order Reprints Request Corporate Permissions

Academic Permissions

Please note: Selecting permissions does not provide access to the full text of the article, please see our help page How do I view content?

Obtain permissions instantly via Rightslink by clicking on the button below:

Request Academic Permissions

If you are unable to obtain permissions via Rightslink, please complete and submit this Permissions form. For more information, please visit our Permissions help page.

Related research

People also read lists articles that other readers of this article have read.

Recommended articles lists articles that we recommend and is powered by our AI driven recommendation engine.

Cited by lists all citing articles based on Crossref citations.
Articles with the Crossref icon will open in a new tab.