Fourier‐based numerical approximation of the Weertman equation for moving dislocations |
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| Authors: | Marc Josien Yves‐Patrick Pellegrini Frédéric Legoll Claude Le Bris |
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| Affiliation: | 1. école des Ponts and INRIA, 6 et 8 avenue Blaise Pascal, 77455 Marne‐La‐Vallée Cedex 2, France;2. CEA, DAM, DIF, F‐91297 Arpajon, France |
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| Abstract: | This work addresses the numerical approximation of solutions to a dimensionless form of the Weertman equation, which models a steadily moving dislocation and is an important extension (with advection term) of the celebrated Peierls‐Nabarro equation for a static dislocation. It belongs to the class of nonlinear reaction‐advection‐diffusion integro‐differential equations with Cauchy‐type kernel, thus involving an integration over an unbounded domain. In the Weertman problem, the unknowns are the shape of the core of the dislocation and the dislocation velocity. The proposed numerical method rests on a time‐dependent formulation that admits the Weertman equation as its long‐time limit. Key features are (1) time iterations are conducted by means of a new, robust, and inexpensive Preconditioned Collocation Scheme in the Fourier domain, which allows for explicit time evolution but amounts to implicit time integration, thus allowing for large time steps; (2) as the integration over the unbounded domain induces a solution with slowly decaying tails of important influence on the overall dislocation shape, the action of the operators at play is evaluated with exact asymptotic estimates of the tails, combined with discrete Fourier transform operations on a finite computational box of size L; (3) a specific device is developed to compute the moving solution in a comoving frame, to minimize the effects of the finite‐box approximation. Applications illustrate the efficiency of the approach for different types of nonlinearities, with systematic assessment of numerical errors. Converged numerical results are found insensitive to the time step, and scaling laws for the combined dependence of the numerical error with respect to L and to the spatial step size are obtained. The method proves fast and accurate and could be applied to a wide variety of equations with moving fronts as solutions; notably, Weertman‐type equations with the Cauchy‐type kernel replaced by a fractional Laplacian. |
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| Keywords: | Cauchy‐type nonlinear integro‐differential equation discrete Fourier transform fractional Laplacian Peierls‐Nabarro equation preconditioned scheme reaction‐advection‐diffusion equation |
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