ADI spectral collocation methods for parabolic problems |
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Authors: | B. Bialecki J. de Frutos |
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Affiliation: | 1. Department of Mathematical and Computer Sciences, Colorado School of Mines, Golden, CO 80401, United States;2. Departamento Matematica Applicada, Universidad de Valladolid, 47005 Valladolid, Spain |
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Abstract: | We discuss the Crank–Nicolson and Laplace modified alternating direction implicit Legendre and Chebyshev spectral collocation methods for a linear, variable coefficient, parabolic initial-boundary value problem on a rectangular domain with the solution subject to non-zero Dirichlet boundary conditions. The discretization of the problems by the above methods yields matrices which possess banded structures. This along with the use of fast Fourier transforms makes the cost of one step of each of the Chebyshev spectral collocation methods proportional, except for a logarithmic term, to the number of the unknowns. We present the convergence analysis for the Legendre spectral collocation methods in the special case of the heat equation. Using numerical tests, we demonstrate the second order accuracy in time of the Chebyshev spectral collocation methods for general linear variable coefficient parabolic problems. |
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Keywords: | Parabolic initial-boundary value problems Crank&ndash Nicolson Laplace modified ADI Spectral collocation Legendre and Chebyshev polynomials |
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