Numerical Schemes for Solving the Time-Fractional Dual-Phase-Lagging Heat Conduction Model in a Double-Layered Nanoscale Thin Film

This article proposes a time fractional dual-phase-lagging (DPL) heat conduction model in a double-layered nanoscale thin film with the temperature-jump boundary condition and a thermal lagging effect interfacial condition between layers. The model is proved to be well-posed. A finite difference scheme with second-order spatial convergence accuracy in maximum norm is then presented for solving the fractional DPL model. Unconditional stability and convergence of the scheme are proved by using the discrete energy method. A numerical example without exact solution is given to verify the accuracy of the scheme. Finally, we show the applicability of the time fractional DPL model by predicting the temperature rise in a double-layered nanoscale thin film, where a gold layer is on a chromium padding layer exposed to an ultrashort-pulsed laser heating.

[1]  H. Belmabrouk,et al.  Effect of second-order temperature jump in Metal-Oxide-Semiconductor Field Effect Transistor with Dual-Phase-Lag model , 2015, Microelectron. J..

[2]  J. Ghazanfarian,et al.  Effect of boundary phonon scattering on Dual-Phase-Lag model to simulate micro- and nano-scale heat conduction , 2009 .

[3]  W. Dai,et al.  Accurate numerical method for solving dual-phase-lagging equation with temperature jump boundary condition in nano heat conduction , 2013 .

[4]  J. Ghazanfarian,et al.  Dual-phase-lag analysis of CNT–MoS2–ZrO2–SiO2–Si nano-transistor and arteriole in multi-layered skin , 2018, Applied Mathematical Modelling.

[5]  T. Fisher,et al.  Electron-Phonon Coupling and Thermal Conductance at a Metal-Semiconductor Interface: First-principles Analysis , 2015, 1501.02763.

[6]  M. Caputo Linear Models of Dissipation whose Q is almost Frequency Independent-II , 1967 .

[7]  Y. Povstenko FRACTIONAL HEAT CONDUCTION EQUATION AND ASSOCIATED THERMAL STRESS , 2004 .

[8]  Da Yu Tzou,et al.  Nonlocal behavior in phonon transport , 2011 .

[9]  Zhi‐zhong Sun,et al.  A fully discrete difference scheme for a diffusion-wave system , 2006 .

[10]  Analysis of microscale heat transfer and ultrafast thermoelasticity in a multi-layered metal film with nonlinear thermal boundary resistance , 2013 .

[11]  Investigation of highly non-linear dual-phase-lag model in nanoscale solid argon with temperature-dependent properties , 2014 .

[12]  Hamdy M. Youssef,et al.  Theory of Fractional Order Generalized Thermoelasticity , 2010 .

[13]  A second‐order finite difference scheme for solving the dual‐phase‐lagging equation in a double‐layered nanoscale thin film , 2017 .

[14]  A high order accurate numerical method for solving two‐dimensional dual‐phase‐lagging equation with temperature jump boundary condition in nanoheat conduction , 2015 .

[15]  Jeng-Rong Ho,et al.  Study of heat transfer in multilayered structure within the framework of dual-phase-lag heat conduction model using lattice Boltzmann method , 2003 .

[16]  Cui-Cui Ji,et al.  Numerical Method for Solving the Time-Fractional Dual-Phase-Lagging Heat Conduction Equation with the Temperature-Jump Boundary Condition , 2018, J. Sci. Comput..

[17]  Jafar Ghazanfarian,et al.  A novel SPH method for the solution of Dual-Phase-Lag model with temperature-jump boundary condition in nanoscale , 2015 .

[18]  P. McEuen,et al.  Thermal transport measurements of individual multiwalled nanotubes. , 2001, Physical Review Letters.

[19]  I. Podlubny Fractional differential equations , 1998 .

[20]  P. Keblinski,et al.  Ballistic vs. diffusive heat transfer across nanoscopic films of layered crystals , 2014 .

[21]  Zahra Shomali,et al.  Investigation of dual-phase-lag heat conduction model in a nanoscale metal-oxide-semiconductor field-effect transistor , 2012 .

[22]  Abbas Abbassi,et al.  Macro- to Nanoscale Heat and Mass Transfer: The Lagging Behavior , 2015 .

[23]  A. Alikhanov A priori estimates for solutions of boundary value problems for fractional-order equations , 2010, 1105.4592.

[24]  Tian Jian Lu,et al.  Fractional order generalized electro-magneto-thermo-elasticity , 2013 .

[25]  Miao Liao,et al.  New insight on negative bias temperature instability degradation with drain bias of 28 nm High-K Metal Gate p-MOSFET devices , 2014, Microelectron. Reliab..

[26]  Kuo-Chi Liu,et al.  Analysis of dual-phase-lag thermal behaviour in layered films with temperature-dependent interface thermal resistance , 2005 .

[27]  A. Balandin Thermal properties of graphene and nanostructured carbon materials. , 2011, Nature materials.

[28]  Fawang Liu,et al.  Novel numerical analysis of multi-term time fractional viscoelastic non-newtonian fluid models for simulating unsteady MHD Couette flow of a generalized Oldroyd-B fluid , 2017, Fractional Calculus and Applied Analysis.

[29]  H. Sherief,et al.  Fractional order theory of thermoelasticity , 2010 .

[30]  Emad Awad On the Generalized Thermal Lagging Behavior: Refined Aspects , 2012 .