Abstract
Thermal interaction between two-layered thin metal film and the ultra-short laser pulse is considered. The problem is described by the system of the dual-phase lag equations supplemented by the appropriate boundary and initial conditions. To solve these equations the general boundary element method (GBEM) is proposed. At first, the GBEM for one layer is presented. Next, using the ideal contact condition at the interface between the layers (the form of this condition in the case of DPLE differs significantly from the classical condition occurring in the Fourier-type models), the final system of algebraic equations is formulated. At the stage of numerical computations the different intensities of the laser beam and the different exposure times are taken into account. The results are compared with the repeatedly verified explicit scheme of the finite difference method. The impact of the time step and length of internal cells on the results of computations is also discussed.
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References
Zhang Y, Tzou DY, Chen JK (2009) Micro- and nanoscale heat transfer in femtosecond laser processing of metals. In: Barret PH, Palmerm M (eds) High-power and femtosecond lasers: properties, materials and applications. Nova Science Publishers, Inc., Hauppauge, pp 159–206 (Chapter 5). arXiv:1511.03566 [physics.comp-ph]
Zhang ZM (2007) Nano/microscale heat transfer. McGraw-Hill
Tzou DY (2015) Macro to microscale heat transfer: the lagging behavior. Wiley
Anisimov SI, Kapeliovich BL, Perelman TL (1974) Electron emission from metal surfaces exposed to ultrashort laser pulses. JETP 66:375–377
Qiu TQ, Tien LC (1993) Heat transfer mechanisms during short-pulse laser heating of metals. J Heat Transfer 115(4):835–837
Chen JK, Tzou DY, Beraun JE (2006) A semiclassical two-temperature model for ultrafast laser heating. Int J Heat Mass Transf 49(1):307–316
Niu T, Dai W (2009) A hyperbolic two-step model based finite difference scheme for studying thermal deformation in a double-layered thin film exposed to ultrashort-pulsed lasers. Int J Therm Sci 48(1):34–49
Dziatkiewicz J, Kus W, Majchrzak E, Burczynski T, Turchan L (2014) Bioinspired identification of parameters in microscale heat transfer. Int J Multiscale Comput Eng 12(1):79–89
Huang J, Baheti K, Chen JK, Zhang Y (2011) An axisymmetric model for solid-liquid-vapor phase change in thin metal films induced by an ultrashort laser pulse. Front Heat Mass Transf 2(1):1–10
Majchrzak E, Dziatkiewicz J, Turchan L (2017) Analysis of thermal processes occurring in the microdomain subjected to the ultrashort laser pulse using the axisymmetric two-temperature model. Int J Multiscale Comput Eng 15(5):395–411
Baheti K, Huang J, Chen JK, Zhang Y (2011) An axisymmetric interfacial tracking model for melting and resolidification in a thin metal film irradiated by ultrashort pulse lasers. Int J Therm Sci 50(1):25–35
Ho JR, Kuo CP, Jiaung WS (2003) Study of heat transfer in multilayered structure within the framework of dual-phase-lag heat conduction model using lattice Boltzmann method. Int J Heat Mass Transf 46(1):55–69
Mochnacki B, Paruch M (2013) Estimation of relaxation and thermalization times in microscale heat transfer model. J Theoret Appl Mech 51(4):837–845
Ramadan K, Tyfour WR, Al-Nimr MA (2009) On the analysis of short-pulse laser heating of metals using the dual phase lag heat conduction model. J Heat Transf 131(11):111301
Majchrzak E, Mochnacki B, Suchy JS (2009) Numerical simulation of thermal processes proceeding in a multi-layered film subjected to ultrafast laser heating. J Theoret Appl Mech 47(2):383–396
Mochnacki B, Ciesielski M (2016) Dual phase lag model of melting process in domain of metal film subjected to an external heat flux. Arch Foundry Eng 16(4):85–90
Liao S (1997) General boundary element method for non-linear heat transfer problems governed by hyperbolic heat conduction equation. Comput Mech 20:397–406
Liao SJ (1998) On the general boundary element method. Eng Anal Boundary Elem 2:39–51
Hetmaniok E, Nowak I, Slota D, Witula R (2012) Application of the homotopy perturbation method for the solution of inverse heat conduction problem. Int Commun Heat Mass Transfer 39:30–35
Slota D (2010) The application of the homotopy perturbation method to one-phase inverse Stefan problem. Int Commun Heat Mass Transfer 37:587–592
Majchrzak E (2010) Numerical solution of dual phase lag model of bioheat transfer using the general boundary element method. CMES Comput Model Eng Sci 69(1):43–60
Majchrzak E, Turchan L (2015) The general boundary element method for 3D dual-phase lag model of bioheat transfer. Eng Anal Boundary Elem 50:76–82
Brebbia CA, Telles JCF, Wrobel LC (1984) Boundary element techniques. Springer, Berlin
Majchrzak E, Mochnacki B (2017) Numerical model of thin metal film heating using the boundary element method. Comput Methods Mater Sci 17(1):12–17
Majchrzak E, Kałuża G (2017) Analysis of thermal processes occurring in the heated multilayered metal films using the dual-phase lag model. Arch Mech 69(4–5):275–287
Iida T, Guthrie RIL (2015) The thermophysical properties of metallic liquids, volume 1: fundamentals. Oxford
Al-Nimr MA, Naji M, Abdallah RI (2004) Thermal behavior of a multi-layered thin slab carrying periodic signals under the effect of the dual-phase-lag heat conduction model. Int J Thermophys 25(3):949–966
Karakas A, Tunc M, Camdali U (2010) Thermal analysis of thin multi-layer metal films during femtosecond laser heating. Heat Mass Transf 46:1287–1293
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The paper and research are financed within the project 2015/19/B/ST8/01101 sponsored by National Science Centre (Poland).
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Majchrzak, E. (2020). General Boundary Element Method for the Dual-Phase Lag Equations Describing the Heating of Two-Layered Thin Metal Films. In: Öchsner, A., Altenbach, H. (eds) Engineering Design Applications II. Advanced Structured Materials, vol 113. Springer, Cham. https://doi.org/10.1007/978-3-030-20801-1_20
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DOI: https://doi.org/10.1007/978-3-030-20801-1_20
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