A high order accurate numerical method for solving two‐dimensional dual‐phase‐lagging equation with temperature jump boundary condition in nanoheat conduction |
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| Authors: | Hong Sun Rui Du Weizhong Dai Zhi‐zhong Sun |
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| Affiliation: | 1. Department of Mathematics, Southeast University, Nanjing, People's Republic of China;2. School of Mathematics and Physics, Jiangsu University of Science and Technology, Zhenjiang, People's Republic of China;3. Department of Mathematics and Statistics, Louisiana Tech University, Ruston, Louisiana |
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| Abstract: | Dual‐phase‐lagging (DPL) equation with temperature jump boundary condition (Robin's boundary condition) shows promising for analyzing nanoheat conduction. For solving it, development of higher‐order accurate and unconditionally stable (no restriction on the mesh ratio) numerical schemes is important. Because the grid size may be very small at nanoscale, using a higher‐order accurate scheme will allow us to choose a relative coarse grid and obtain a reasonable solution. For this purpose, recently we have presented a higher‐order accurate and unconditionally stable compact finite difference scheme for solving one‐dimensional DPL equation with temperature jump boundary condition. In this article, we extend our study to a two‐dimensional case and develop a fourth‐order accurate compact finite difference method in space coupled with the Crank–Nicolson method in time, where the Robin's boundary condition is approximated using a third‐order accurate compact method. The overall scheme is proved to be unconditionally stable and convergent with the convergence rate of fourth‐order in space and second‐order in time. Numerical errors and convergence rates of the solution are tested by two examples. Numerical results coincide with the theoretical analysis. © 2015 Wiley Periodicals, Inc. Numer Methods Partial Differential Eq 31: 1742–1768, 2015 |
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| Keywords: | nanoheat conduction Robin's boundary condition compact finite difference scheme stability convergence |
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