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Mechanics Based Design of Structures and Machines
An International Journal
Volume 50, 2022 - Issue 11
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Articles

Effect of dual-phase-lag model on free vibrations of isotropic homogenous nonlocal thermoelastic hollow sphere with voids

Dinesh Kumar Sharmaa Department of Mathematics, Maharaja Agrasen University, Solan, Himachal Pradesh, IndiaORCID Iconhttps://orcid.org/0000-0001-7652-9902
ORCID Icon,
Prakash Chand Thakurb School of Basic Sciences (Mathematics), Bahra University, Solan, Himachal Pradesh, India
&
Nantu Sarkarc Department of Applied Mathematics, University of Calcutta, Kolkata, West Bengal, IndiaCorrespondence[email protected]
ORCID Iconhttps://orcid.org/0000-0001-9144-4587
ORCID Icon
Pages 3949-3965 | Received 10 Apr 2020, Accepted 14 Sep 2020, Published online: 26 Sep 2020

References

  • Abbas, I. A. 2015a. Analytical solution for a free vibration of a thermoelastic hollow sphere. Mechanics Based Design of Structures and Machines 43 (3):265–76. doi:10.1080/15397734.2014.956244.
  • Abbas, I. A. 2015b. A dual phase lag model on thermoelastic interaction in an infinite fiber-reinforced anisotropic medium with a circular hole. Mechanics Based Design of Structures and Machines 43 (4):501–13. doi:10.1080/15397734.2015.1029589.
  • Achenbach, J. D. 2005. The thermo-elasticity of laser based ultrasonics. The Journal of Thermal Stresses 28 (6–7):713–28. doi:10.1080/01495730590929368.
  • Ali, Y. M., and L. C. Zhang. 2005. Relativistic heat conduction. International Journal of Heat and Mass Transfer 48 (12):2397–406. doi:10.1016/j.ijheatmasstransfer.2005.02.003.
  • Altan, B. S. 1984. Uniqueness in the linear theory of nonlocal elasticity. Bulletin of the Technical University of Istanbul 37:373–85.
  • Bachher, M., and N. Sarkar. 2019. Nonlocal theory of thermoelastic materials with voids and fractional derivative heat transfer. Waves in Random and Complex Media 29 (4):595–613. doi:10.1080/17455030.2018.1457230.
  • Bai, C., and A. S. Lavine. 1995. On Hyperbolic heat conduction and the second law of thermodynamics. Journal of Heat Transfer 117 (2):256–63. doi:10.1115/1.2822514.
  • Biot, M. 1956. Thermoelasticity and irreversible thermodynamics. Journal of Applied Physics 27 (3):240–53. doi:10.1063/1.1722351.
  • Buchanan, G. R., and G. R. Ramirez. 2002. A note on the vibration of transversely isotropic solid spheres. Journal of Sound and Vibration 253 (3):724–32. doi:10.1006/jsvi.2001.4054.
  • Chandrasekharaiah, D. S. 1998. Hyperbolic thermoelasticity: A review of recent literature. Applied Mechanics Reviews 51 (12):705–29. doi:10.1115/1.3098984.
  • Cowin, S. C., and J. W. Nunziato. 1983. Linear elastic materials with voids. Journal of Elasticity 13 (2):125–47. doi:10.1007/BF00041230.
  • Dhaliwal, R. S., and A. Singh. 1980. Dynamic coupled thermoelasticity. New York: Hindustan Publishing Corporation.
  • Eltaher, M. A., F. A. Omar, W. S. Abdalla, and E. H. Gad. 2019. Bending and vibrational behaviors of piezoelectric nonlocal nano-beam including surface elasticity. Waves in Random and Complex Media 29 (2):264–80. doi:10.1080/17455030.2018.1429693.
  • Eringen, A. C. 1972. Nonlocal polar elastic continua. International Journal of Engineering Science 10 (1):1–16. doi:10.1016/0020-7225(72)90070-5.
  • Eringen, A. C. 1974. Theory of nonlocal thermoelasticity. International Journal of Engineering Science 12 (12):1063–77. doi:10.1016/0020-7225(74)90033-0.
  • Eringen, A. C. 1991. Memory–dependent nonlocal electromagnetic elastic solids and super-conductivity. Journal of Mathematical Physics 32 (3):787–96. doi:10.1063/1.529372.
  • Eringen, A. C. 2002. Nonlocal continuum field theories. New York: Springer Verlag.
  • Green, A. E., and K. A. Lindsay. 1972. Thermo-elasticity. Journal of Elasticity 2 (1):1–7. doi:10.1007/BF00045689.
  • Iesan, D. 1986. A theory of thermoelastic materials with voids. Acta Mechanica 60:67–89.
  • Keles, I., and N. Tutuncu. 2011. Exact analysis of axisymmetric dynamic response of functionally graded Cylinders (or disks) and Spheres. Journal of Applied Mechanics 78 (6):1–7. doi:10.1115/1.4003914.
  • Lamb, H. 1881. On the vibrations of an elastic sphere. Proceedings of the London Mathematical Society s1–13 (1):189–212. doi:10.1112/plms/s1-13.1.189.
  • Lord, H., and Y. Shulman. 1967. A generalized dynamical theory of thermo-elasticity. Journal of the Mechanics and Physics of Solids 15 (5):299–309. doi:10.1016/0022-5096(67)90024-5.
  • Magana, A., A. Miranville, and R. Quintanilla. 2018. On the stability in phase-lag heat conduction with two temperatures. Journal of Evolution Equations 18 (4):1697–712. doi:10.1007/s00028-018-0457-z.
  • Mishra, K. C., J. N. Sharma, and P. K. Sharma. 2017. Analysis of vibrations in a non-homogeneous thermoelastic thin annular disk under dynamic pressure. Mechanics Based Design of Structures and Machines 45 (2):207–18. doi:10.1080/15397734.2016.1166060.
  • Moosapour, M., M. A. Hajabasi, and H. Ehteshami. 2014. Thermoelastic damping effect analysis in micro flexural resonator of atomic force microscopy. Applied Mathematical Modelling 38 (11–12):2716–33. doi:10.1016/j.apm.2013.10.067.
  • Mondal, S., and M. Kanoria. 2020. Thermoelastic solutions for thermal distributions moving over thin slim rod under memory-dependent three-phase lag magneto-thermoelasticity. Mechanics Based Design of Structures and Machines 48 (3):277–22. doi:10.1080/15397734.2019.1620529.
  • Mondal, S., N. Sarkar, and N. Sarkar. 2019. Waves in dual-phase-lag thermoelastic materials with voids based on Eringen’s nonlocal elasticity. Journal of Thermal Stresses 42 (8):1035–50. doi:10.1080/01495739.2019.1591249.
  • Narendar, S., and S. Gopalakrishnan. 2010. Nonlocal scale effects of ultrasonic wave characteristics of nanorods. Physica E: Low-Dimensional Systems and Nanostructures 42 (5):1601–4. doi:10.1016/j.physe.2010.01.002.
  • Ning, Y. U., I. Shoji, and I. Tatsuo. 2004. Characteristics of temperature field due to pulsed heat input calculated by non-Fourier heat conduction hypothesis. JSME International Journal of Series A 47:574–80.
  • Othman, M. I. A., E. M. Abd-Elaziz, and M. I. M. Hilal. 2020. State-space approach to a 2-D generalized thermoelastic medium under the effect of inclined load and gravity using a dual-phase-lag model. Mechanics Based Design of Structures and Machines. doi:10.1080/15397734.2020.1717966.
  • Othman, M. I. A., and E. E. M. Eraki. 2017. Generalized magneto-thermoelastic half-space with diffusion under initial stress using three-phase-lag model. Mechanics Based Design of Structures and Machines 45 (2):145–59. doi:10.1080/15397734.2016.1152193.
  • Povstenko, Y. Z. 1999. The nonlocal theory of elasticity and its applications to the description of defects in solid bodies. Journal of Mathematical Sciences 97 (1):3840–5. doi:10.1007/BF02364923.
  • Quintanilla, R. 2009. A well-posed problem for the three-dual-phase-lag heat conduction. Journal of Thermal Stresses 32 (12):1270–8. doi:10.1080/01495730903310599.
  • Roy Choudhuri, S. K. 2007. On a thermoelastic three-phase-lag model. Journal of Thermal Stresses 30 (3):231–8. doi:10.1080/01495730601130919.
  • Samia, M. S. 2019. Effects of phase-lags, rotation, and temperature-dependent properties on plane waves in a magneto-microstretch thermoelastic medium. Mechanics Based Design of Structures and Machines. doi:10.1080/15397734.2019.1693898.
  • Sarkar, N., S. De, and N. Sarkar. 2019. Waves in nonlocal thermoelastic solids of type II. Journal of Thermal Stresses 42 (9):1153–70. doi:10.1080/01495739.2019.1618760.
  • Sharma, D. K. 2016. Free vibrations of homogeneous isotropic viscothermoelastic spherical curved plates. Journal of Applied Science and Engineering 19:135–48.
  • Sharma, D. K., M. Bachher, and N. Sarkar. 2020. Effect of phase-lags on the transient waves in an axisymmetric functionally graded viscothermoelastic spherical cavity in radial direction. International Journal of Dynamics and Control. doi:10.1007/s40435-020-00659-2.
  • Sharma, D. K., M. Bachher, M. K. Sharma, and N. Sarkar. 2020. On the analysis of free vibrations of nonlocal elastic sphere of FGM type in generalized thermoelasticity. Journal of Vibration Engineering and Technologies. doi:10.1007/s42417-020-00217-2.
  • Sharma, D. K., M. Bachher, S. Manna, and N. Sarkar. 2020. Vibration analysis of functionally graded thermoelastic nonlocal sphere with dual-phase-lag effect. Acta Mechanica 231 (5):1765–81. doi:10.1007/s00707-020-02612-y.
  • Sharma, D. K., and H. Mittal. 2019. Analysis of Free vibrations of axisymmetric functionally graded generalized viscothermoelastic cylinder using series solution. Journal of Vibration Engineering and Technologies. doi:10.1007/s42417-019-00178-1.
  • Sharma, D. K., H. Mittal, and S. R. Sharma. 2019. Forced vibration analysis in axisymmetric functionally graded viscothermoelastic hollow cylinder under dynamic pressure. Proceedings of National Academy of Sciences India Physical Science, Section A. doi:10.1007/s40010-019-00634-3.
  • Sharma, D. K., D. Thakur, V. Walia, and N. Sarkar. 2020. Free vibration analysis of a nonlocal thermoelastic hollow cylinder with diffusion. Journal of Thermal Stresses 43 (8):981–97. doi:10.1080/01495739.2020.1764425.
  • Sharma, J. N., D. K. Sharma, and S. S. Dhaliwal. 2013. Free vibration analysis of a rigidly fixed viscothermoelastic hollow sphere. Indian Journal of Pure and Applied Mathematics 44 (5):559–86. doi:10.1007/s13226-013-0030-y.
  • Sharma, P. K., and K. C. Mishra. 2017. Analysis of thermoelastic response in functionally graded hollow sphere without load. Journal of Thermal Stresses 40 (2):185–97. doi:10.1080/01495739.2016.1231024.
  • Tzou, D. Y. 1995. A unified field approaches for heat conduction from macro to micro-scales. Journal of Heat Transfer 117 (1):8–16. doi:10.1115/1.2822329.
  • Wang, J., and R. S. Dhaliwal. 1993. Uniqueness in generalized nonlocal thermoelasticity. Journal of Thermal Stresses 16 (1):71–7. doi:10.1080/01495739308946217.
  • Yu, Y. J., X. G. Tian, and X. R. Liu. 2015. Size-dependent generalized thermoelasticity using Eringen’s nonlocal model. European Journal of Mechanics—A/Solids 51:96–106. doi:10.1016/j.euromechsol.2014.12.005.
  • Zenkour, A. M., and A. E. Abouelregal. 2014. Nonlocal thermoelastic vibrations for variable thermal conductivity nano-beams due to harmonically varying heat. Journal of Vibro Engineering 16 (8):3665–78.

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