Chebyshev spectral collocation methods for approximating the solution of Burgers' equation are defined and analyzed. Discretization in time by an implicit/explicit single step method is discussed. This method is shown to be stable under a very weak condition on the time step, for the (linear) diffusive part is dealt with implicitly. Besides, fast transform methods can be used to compute the explicit (non linear) convective term. Optimal order error estimates are established in the weighted L2-norm. © 1986 Instituto di Elaborazione della Informazione del CNR.

An implicit/explicit spectral method for Burgers' equation

QUARTERONI, ALFIO MARIA
1986

Abstract

Chebyshev spectral collocation methods for approximating the solution of Burgers' equation are defined and analyzed. Discretization in time by an implicit/explicit single step method is discussed. This method is shown to be stable under a very weak condition on the time step, for the (linear) diffusive part is dealt with implicitly. Besides, fast transform methods can be used to compute the explicit (non linear) convective term. Optimal order error estimates are established in the weighted L2-norm. © 1986 Instituto di Elaborazione della Informazione del CNR.
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Utilizza questo identificativo per citare o creare un link a questo documento: http://hdl.handle.net/11311/669762
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