Top

Journal of Engineering Mathematics

Published in:

01-10-2023

Mathematical modelling of laser-instigated magneto-thermo-mechanical interactions inside half-space

Author: Rakhi Tiwari

Published in: Journal of Engineering Mathematics | Issue 1/2023

Activate our intelligent search to find suitable subject content or patents.

search-config

AI-assisted search

Off

Abstract

Coupling of mechanical, thermal and magnetic fields attracts the scientific community due to its numerous applications in geophysics, engineering, structures, aeronautics etc. To study the magneto-thermo-mechanical-interactions caused by laser heat input inside an infinite half-space structure, current investigation address a new generalized thermoelastic model incorporating nonlocal Moore–Gibson–Thompson approach with memory-dependent derivatives. A heat transfer equation half-space media is being pronounced with the magnetic field. A heat transfer equation based on memory-dependent derivatives is formulated by Eringen’s assumptions of nonlocal impact. The closed form solutions for the half-space system are determined in the Laplace transform domain. The distributions of physical fields such as temperature, displacement, thermal stress and stain are obtained in physical domain by adopting an approximation algorithm. With the help of computational outcomes and the graphical figures, the effects of effective parameters such as non-singular kernel functions, time delay and nonlocal quantum are revealed on the variations of the field quantities. Further, in order to exhibit the attractiveness of the nonlocal MGT model, a comparison of the current thermal conductivity model with previously established nonlocal classical and nonlocal generalized thermal conductivity models is made through the graphical results.

previous article The second law of thermodynamics for open systems

Dont have a licence yet? Then find out more about our products and how to get one now:

Springer Professional "Wirtschaft+Technik"

Online-Abonnement

Mit Springer Professional "Wirtschaft+Technik" erhalten Sie Zugriff auf:

über 102.000 Bücher
über 537 Zeitschriften

aus folgenden Fachgebieten:

Automobil + Motoren
Bauwesen + Immobilien
Business IT + Informatik
Elektrotechnik + Elektronik
Energie + Nachhaltigkeit
Finance + Banking
Management + Führung
Marketing + Vertrieb
Maschinenbau + Werkstoffe
Versicherung + Risiko

Jetzt Wissensvorsprung sichern!

inform now

Springer Professional "Technik"

Online-Abonnement

Mit Springer Professional "Technik" erhalten Sie Zugriff auf:

über 67.000 Bücher
über 390 Zeitschriften

aus folgenden Fachgebieten:

Automobil + Motoren
Bauwesen + Immobilien
Business IT + Informatik
Elektrotechnik + Elektronik
Energie + Nachhaltigkeit
Maschinenbau + Werkstoffe

Jetzt Wissensvorsprung sichern!

inform now

Available only for authorised users

Said SM (2015) Deformation of a rotating two-temperature generalized magneto-thermoelastic medium with internal heat source due to hydrostatic initial stress. Meccanica 50:2077–2091MathSciNetMATHCrossRef

Said SM (2019) Eigenvalue approach on a problem of magneto-thermoelastic rotating medium with variable thermal conductivity: comparisons of three theories. Wave Random Complex Media 31(6):1322–1339MathSciNetMATHCrossRef

Said SM (2016) Two-temperature generalized magneto-thermoelastic medium for dual-phase lag model under the effect of gravity field and hydrostatic initial stress. Multidiscip Model Mater Struct 12:362–383CrossRef

Misra JC, Chattopadhyay NC, Chakravorty A (2000) Study of thermoelastic wave propagation in a halfspace using GN theory. J Therm Stress 23:327–351CrossRef

Wang JL, Li HF (2011) Surpassing the fractional derivative: concept of the memory-dependent derivative. Comput Math Appl 62:1562–1567MathSciNetMATH

Yu YJ, Hu W, Tian XG (2014) A novel generalized thermoelasticity model based on memory-dependent derivative. Int J Eng Sci 81:123–134MathSciNetMATHCrossRef

Kaur I, Lata P, Handa KS (2020) Effects of memory dependent derivative of bio-heat model in skin tissue exposed to laser radiation. EAI Endors Trans Pervas Health Technol 6(22)

Kumar R, Tiwari R, Singhal A, Mondal S (2021) Characterization of thermal damage of skin tissue subjected to moving heat source in the purview of dual phase lag theory with memory-dependent derivative. Wave Random Complex Media 1–18

Tiwari R, Kumar R, Abouelregal AE (2021) Analysis of magneto-thermoelastic problem in piezo-elastic medium under the theory of non-local memory dependent heat conduction with three phase lags. Mech Time Depend Mater 26:271–287 CrossRef

10.

Kumar R, Tiwari R, Kumar R (2020) Significance of memory-dependent derivative approach for the analysis of thermoelastic damping in micromechanical resonators. Mech Time Depend Mater 26:101–118CrossRef

11.

Lotfy K, Sarkar N (2017) Memory-dependent derivatives for photothermal semiconducting medium in generalized thermoelasticity with two-temperature. Mech Time Depend Mater 21:519–534CrossRef

12.

Ezzat MA, El-Karamany AS, El-Bary AA (2014) Generalized thermo-viscoelasticity with memory-dependent derivatives. Int J Mech Sci 89:470–475CrossRef

13.

Ezzat MA, El-Karamany AS, El-Bary AA (2015) Generalized thermoelasticity with memory dependent derivatives involving two temperatures. Mech Adv Mater Struct 23(5):545–553CrossRef

14.

El-Karamany AS, El-Bary AA (2016) Electro-thermoelasticity theory with memory-dependent derivative heat Transfer. Int J Eng Sci 99:22–38MathSciNetMATHCrossRef

15.

Yu YJ, Tian X, Liu XR (2015) Size-dependent generalized thermoelasticity using Eringen’s nonlocal model. Eur J Mech A Solids 51:96–106MathSciNetMATHCrossRef

16.

Tzou DY, Guo ZY (2010) Nonlocal behavior in thermal lagging. Int J Therm Sci 49(7):1133–1137CrossRef

17.

Gupta M, Mukhopadhyay S (2019) A study on generalized thermoelasticity theory based on non-local heat conduction model with dual-phase-lag. J Therm Stresses 42(9):1123–1135CrossRef

18.

Guo ZY, Hou QW (2010) Thermal wave based on the thermomass model. J. Heat Transf. 132(7):072403CrossRef

19.

Tiwari R, Kumar R (2022) Non-local effect on quality factor of micro-mechanical resonator under the purview of three phase lag thermoelasticity with memory dependent derivative. Appl Phys A 128:190CrossRef

20.

Tiwari R, Kumar R (2021) Analysis of plane wave propagation under the purview of three phase lag theory of thermoelasticity with non-local effect. Eur J Mech A Solids 88:104235MathSciNetCrossRefMATH

21.

Olsen FO, Alting L (1989) Cutting front formation in laser cutting CIRP annals. Manuf Technol 38(1):215–218CrossRef

22.

Schaaf P (2002) Laser nitriding of metals. Prog Mater Sci 47(1):1–161CrossRef

23.

Dubey AK, Yadava V (2008) Laser beam machining—a review. Int J Mach Tools Manuf 48(6):609–628CrossRef

24.

Biot MA (1956) hermoelasticity and irreversible thermodynamics. J Appl Phys 27(3):240–253MathSciNetMATHCrossRef

25.

Lord HW, Shulman YA (1967) Generalized dynamical theory of thermoelasticity. J Mech Phys Solids 15:299–309MATHCrossRef

26.

Green AE, Naghdi PM (1991) A re-examination of the basic postulates of thermomechanics. Proc R Soc A Math Phys Eng Sci 432:171–194MathSciNetMATH

27.

Green AE, Naghdi PM (1992) On undamped heat waves in an elastic solid. J Therm Stress 15:253–326MathSciNetCrossRef

28.

Green AE, Naghdi PM (1993) Thermoelasticity without energy dissipation. J Elasticity 31:189–208MathSciNetMATHCrossRef

29.

Tiwari R, Misra JC, Prasad R (2021) Magneto-thermoelastic wave propagation in a finitely conducting medium: A comparative study for three types of thermoelasticity I, II, and III. J Therm Stresses 44(7):785–806CrossRef

30.

Tiwari R, Mukhopadhyay S (2017) On electro-magneto-thermoelastic plane waves under Green–Naghdi theory of thermoelasticity-II. J Therm. Stresses 40(8):1040–1062CrossRef

31.

Dreher M, Quintanilla R, Racke R (2009) Ill-posed problems in thermo-mechanics. Appl Math Lett 22:1374–1379MathSciNetMATHCrossRef

32.

Quintanilla R (2019) Moore–Gibson–Thompson thermoelasticity. Math Mech Solids 24:4020–4031MathSciNetMATHCrossRef

33.

Tiwari R, Kumar R, Abouelregal AE (2022) Thermoelstic vibrations of nano-beam with varying axial load and ramp type heating under the purview of Moore–Gibson–Thomson generalized theory of thermoelasticity. Appl Phys A 128:160CrossRef

34.

Abouelregal AE, Sedighi HM, Shirazi AH, Malikan M, Eremeyev VA (2021) Computational analysis of an infinite magneto-thermoelastic solid periodically dispersed with varying heat flow based on non-local Moore–Gibson–Thompson approach. Contin Mech Thermodyn 34:1067–1085CrossRef

35.

Kaltenbacher B, Lasiecka I, Marchand R (2011) Wellposedness and exponential decay rates for the Moore–Gibson–Thompson equation arising in high intensity ultrasound. Control Cybern 40:971–988MathSciNetMATH

36.

Lasiecka I, Wang X (2015) Moore–Gibson–Thompson equation with memory, part II: general decay of energy. J Differ Equ 259:7610–7635MathSciNetMATHCrossRef

37.

Marchand R, McDevitt T, Triggiani R (2012) An abstract semigroup approach to the third order Moore–Gibson–Thompson partial differential equation arising in high-intensity ultrasound: structural decomposition, spectral analysis, exponential stability. Math Methods Appl Sci 35:1896–1929MathSciNetMATHCrossRef

38.

Pellicer M, Sola-Morales J (2019) Optimal scalar products in the Moore–Gibson–Thompson equation. Evol Equ Control 8:203–220MathSciNetMATH

39.

Thompson PA (1972) Compressible-fluid dynamics. McGraw-Hill, New YorkMATHCrossRef

40.

Quintanilla R (2020) Moore–Gibson–Thompson thermoelasticity with two temperatures. Appl Eng Sci 1:100001

41.

Dell’Oro F, Lasiecka I, Pata V (2016) The Moore–Gibson–Thompson equation with memory in the critical case. J Differ Equ 261:4188–4222MathSciNetMATHCrossRef

42.

Dell’Oro F, Pata V (2017) On the Moore–Gibson–Thompson equation and its relation to linear viscoelasticity. Appl Math Optim 76:641–655MathSciNetMATHCrossRef

43.

Pellicer M, Sola-Morales J (2019) Optimal scalar products in the Moore–Gibson–Thompson equation. Evol Equ Control Theor 8:203–220MathSciNetMATHCrossRef

44.

Conti M, Pata V, Quintanilla R (2019) Thermoelasticity of Moore–Gibson–Thompson type with history dependence in the temperature. Asymptot Anal 120(1–2):1–21MathSciNetMATH

45.

Marin M, Othman MIA, Seadawy AR, Carstea C (2020) A domain of influence in the Moore–Gibson–Thompson theory of dipolar bodies. J Taibah Univ Sci 14(1):653–660CrossRef

46.

Marin M, Öchsner A, Bhatti MM (2020) Some results in Moore–Gibson–Thompson thermoelasticity of dipolar bodies. ZAMM J Appl Math Mech 100(12)CrossRef

47.

Bazarra N, Fernández JR, Quintanilla R (2020) Analysis of a Moore–Gibson–Thompson thermoelastic problem. J Comput Appl Math 382:113058MathSciNetMATHCrossRef

48.

Abouelregal AE, Ahmed IE, Nasr ME, Khalil KM, Zakria A, Mohammed FA (2020) Thermoelastic processes by a continuous heat source line in an infinite solid via Moore Gibson–Thompson thermoelasticity. Materials 13(19):4463CrossRef

49.

Tiwari R, Abouelregal AE (2021) Memory response on magneto-thermoelastic vibrations on a viscoelastic micro-beam exposed to a laser pulse heat source. Appl Math Model 99:328–345MathSciNetMATHCrossRef

50.

Zakian V (1969) Numerical inversions of Laplace transforms. Electron Lett 327:120–121CrossRef

51.

Zakian V (1973) Properties of IMN approximants. In: Graves-Morris PR (ed) Pade approximants and their applications. Academic Press, LondonMATH

52.

Halsted DJ, Brown DE (1972) Zakian’s technique for inverting Laplace transform. Chem Eng J 3:312–313CrossRef

53.

Mondal S, Sur A, Kanoria M (2019) Magneto-thermoelastic interaction in a reinforced medium with cylindrical cavity in context of Caputo–Fabrizio heat transport law. Acta Mech 230:4367–4384MathSciNetMATHCrossRef

54.

Eringen AC (1972) Nonlocal polar elastic continua. Int J Eng Sci 10:1–16MathSciNetMATHCrossRef

55.

Eringen AC (1983) On differential equations of nonlocal elasticity and solutions of screw dislocation and surface waves. J Appl Phys 54(9):4703–4710CrossRef

56.

Eringen AC, Edelen DGB (1972) On nonlocal elasticity. Int J Eng Sci 10(3):233–248MathSciNetMATHCrossRef

57.

Fakher M, Hashemi SH (2021) Nonlinear vibration analysis of two phase local/nonlocal nanobeams with size dependent nonlinearity by using Galerkin method. J Vib Cont 20(3–4):378–391MathSciNetCrossRef

58.

Sedighi HM, Daneshmand F, Abadyan M (2016) Modeling the effects of material properties on the pull-in instability of nonlocal functionally graded nano-actuators. Z Angew Math Mech 96:385–400MathSciNetCrossRef

59.

Sedighi HM (2014) The influence of small scale on the pull-in behaviour of nonlocal nanobridges considering surface effect, Casimir and van der Waals attraction. Int J Appl Mech 6(3):1450030CrossRef

Title: Mathematical modelling of laser-instigated magneto-thermo-mechanical interactions inside half-space
Author: Rakhi Tiwari
Publication date: 01-10-2023
Publisher: Springer Netherlands
Published in: Journal of Engineering Mathematics / Issue 1/2023
Print ISSN: 0022-0833
Electronic ISSN: 1573-2703
DOI: https://doi.org/10.1007/s10665-023-10292-5

Springer Professional

Abstract

Please log in to get access to your license.

Dont have a licence yet? Then find out more about our products and how to get one now:

Springer Professional "Wirtschaft+Technik"

Springer Professional "Technik"

Other articles of this Issue 1/2023

The effects of heterogeneity on solute transport in porous media: anomalous dispersion

A second-order-accurate approximation for the shape of a sessile droplet deformed by gravity

Mathematical modeling of mitigation of carbon dioxide emissions by controlling the population pressure

The second law of thermodynamics for open systems

Numerical identification of the fractal orders in the generalized nonlocal elastic model

Analytic solution and numerical validation of the transient regime in dry surface grinding

Premium Partners