Title of article
Error estimates on the random projection methods for hyperbolic conservation laws with stiff reaction terms Original Research Article
Author/Authors
Weizhu Bao، نويسنده , , Shi Jin، نويسنده ,
Issue Information
روزنامه با شماره پیاپی سال 2002
Pages
19
From page
315
To page
333
Abstract
In this paper we give error estimates on the random projection methods, recently introduced by the authors, for numerical simulations of the hyperbolic conservation laws with stiff reaction terms:
View the MathML source
In this problem, the reaction time ε is small, making the problem numerically stiff. A classic spurious numerical phenomenon—the incorrect shock speed—occurs when the reaction time scale is not properly resolved numerically. The random projection method, a fractional step method that solves the homogeneous convection by any shock capturing method, followed by a random projection for the reaction term, was introduced in [J. Comput. Phys. 163 (2000) 216–248] to handle this numerical difficulty. In this paper, we prove that the random projection methods capture the correct shock speed with a first order accuracy, if a monotonicity-preserving method is used in the convection step. We also extend the random projection method for more general source term View the MathML source, which has finitely many simple zeroes and satisfying ug(u)>0 for large |u|.
Journal title
Applied Numerical Mathematics
Serial Year
2002
Journal title
Applied Numerical Mathematics
Record number
943244
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