https://orcid.org/0000-0003-3363-7924
References
- Lord H, Shulman Y. A generalized dynamic theory of thermoelasticity. J Mech Phys Solids. 1967;15(5):299–309.
- Green AE, Lindsay KA. Thermoelasticity. J Elasticity. 1972;2(1):1–7.
- Green AE, Naghdi PM. A re-examination of the basic postulates of thermomechanics. Proc R Soc Lond. 1991;432(1885):171–194.
- Green AE, Naghdi PM. On undamped heat waves in an elastic solid. J Therm Stress. 1992;15(2):253–264.
- Green AE, Naghdi PM. Thermoelasticity without energy dissipation. J Elasticity. 1993;31(3):189–208.
- Choudhuri SR. On a thermoelastic three-phase-lag model. J Therm Stress. 2007;30(3):231–238.
- Ignaczak J. Uniqueness in generalized thermoelasticity. J Therm Stress. 1979;2(2):171–175.
- Tzou DY. Macro-to microscale heat transfer: the lagging behavior. Abingdon, UK: Taylor & Francis, 1997.
- Scher H, Montroll EW. Anomalous transit-time dispersion in amorphous solid. Phys Rev B. 1975;12:2455–2477.
- Koch DL, Brady JF. Anomalous diffusion in heterogeneous porous media. Phys Rev Fluids. 1988;31:965–973.
- Xue ZN, Chen and ZT, Tian XG. Transient thermal stress analysis for a circumferentially cracked hollow cylinder based on memory-dependent heat conduction model. Theoret Appl Fracture Mech. 2018;96:123–133.
- Li B, Wang J. Anomalous heat conduction and anomalous diffusion in one-dimensional systems. Phys Rev Lett. 2003;91:1–14.
- Povstenko YZ. Fractional heat conduction equation and associated thermal stress. J Therm Stress. 2004;28(1):83–102.
- Sherief HH, El-Sayed AMA, Abd El-Latief AM. Fractional order theory of thermoelasticity. Int J Solids Struct. 2010;47(2):269–275.
- Ezzat MA, El-Karamany AS, Ezzat SM. Two-temperature theory in magnetothermoelasticity with fractional order dual-phase-lag heat transfer. Nucl Eng Des. 2012;252:267–277.
- Caputo M, Mainardi F. A new dissipation model based on memory mechanism. Pure Appl Geophys. 1971;91(1):134–147.
- Caputo M, Mainardi F. Linear models of dissipation in elastic solids. Rivis Nuovo Cim. 1971;1(2):161–198.
- Ezzat MA, El-Karamany AS, Fayik MA. Fractional order theory in thermoelastic solid with three phase lag heat transfer. Arch Appl Mech. 2012;82(4):557–572.
- Yu YJ, Hu W, Tian XG. A novel generalized thermoelasticity model based on memory-dependent derivative. Int J Eng Sci. 2014;81:123–134.
- Diethelm K. Analysis of fractional differential equation: an application oriented exposition using differential operators of Caputo type. Berlin: Springer; 2010.
- Wang JL, Li HF. Surpassing the fractional derivative: concept of the memory-dependent derivative. Comput Math Appl. 2011;62:1562–1567.
- Ezzat MA, El-Karamany AS, El-Bary AA. Modeling of memory-dependent derivative in generalized thermoelasticity. Eur Phys J Plus. 2016;131:372.
- Sur A, Pal P, Mondal S, et al. Finite element analysis in a fiber-reinforced cylinder due to memory-dependent heat transfer. Acta Mech. 2019;230:1607–1624.
- Sur A, Kanoria M. Modeling of fibre-reinforced magneto-thermoelastic plate with heat sources. Procedia Eng. 2017;173:875–882.
- Banerjee S, Shaw S, Mukhopadhyay B. Memory response on thermal wave propagation emanating from a cavity in an unbounded elastic solid. J Therm Stress. 2019;42(2):294–311.
- Caputo M. Linear models of dissipation whose Q is almost frequency independent II. Geophys J Roy Astron Soc. 1967;3:529–539.
- Mondal S, Sur A, Kanoria M. Photo-thermo-elastic wave propagation under the influence of magnetic field in presence of memory responses. Mech Based Design Struct Mach; 2019. doi:10.1080/15397734.2019.1701493
- Mondal S, Sur A, Kanoria M. A memory response in the vibration of a microscale beam induced by laser pulse. J Therm Stress. 2019;42(11):1415–1431.
- Mondal S, Sur A, Kanoria M. Magneto-thermoelastic interaction in a reinforced medium with cylindrical cavity in the context of Caputo-Fabrizio heat transport law. Acta Mech. 2019;230(12):4367–4384.
- Mondal S, Sur A, Kanoria M. Transient response in a piezoelastic medium due to the influence of magnetic field with memory-dependent derivative. Acta Mech. 2019;230(7):2325–2338.
- Abouelregal AE. Modified fractional thermoelasticity model with multi-relaxation times of higher order: application to spherical cavity exposed to a harmonic varying heat. Waves Random Complex Media. 2019:1–21. doi:10.1080/17455030.2019.1628320.
- Abouelregal AE. Two-temperature thermoelastic model without energy dissipation including higher order time-derivatives and two phase-lags. Mater Res Express. 2019;6(11):116535.
- Abouelregal AE. On Green and Naghdi thermoelasticity model without energy dissipation with higher order time differential and phase-lags. J Appl Comput Mech. 2020;6(3):445–456.
- Abouelregal AE. A novel generalized thermoelasticity with higher-order time-derivatives and three-phase lags. Multi Model Mater Struct; 2019. doi:10.1108/MMMS-07-2019-0138
- Abouelregal AE. Three-phase-lag thermoelastic heat conduction model with higher-order time-fractional derivatives. Indian J Phys 2019. doi:10.1007/s12648-019-01635-z
- Tzou Y. A unified field approach for heat conduction from macro-to-microscales. ASME J Heat Transfer. 1995;117:8–16.
- Quintanilla R. Exponential stability in the dual-phase-lag heat conduction theory. J Non Equilibrium Thermodyn. 2002;27:217–227.
- Biot M. Thermoelasticity and irreversible thermodynamics. J Appl Phys 1956;27:240–253.
- Sur A, Kanoria M. Modeling of memory-dependent derivative in a fibre-reinforced plate. Thin Walled Struct. 2018;126:85–93.
- Honig G, Hirdes U. A method for the numerical inversion of Laplace transforms. J Comput Appl Math. 1984;10(1):113–132.
- Tzou DY. Experimental support for the lagging behavior in heat propagation. J Thermophys Heat Transfer. 1995;9(4):686–693.
- Mondal S, Pal P, Kanoria M. Transient response in a thermoelastic half-space solid due to a laser pulse under three theories with memory-dependent derivative. Acta Mech. 2019;230:179–199.
- Xue Z, Tian X, Liu J. Thermal shock fracture of a crack in a functionally gradient half-space based on the memory-dependent heat conduction model. Appl Math Modell. 2020;80:840–858.