Asymptotic estimates of green's function and the “difference step” in the case of Lipschitz-continuous coefficients

A study is made of the elementary hyperbolic equation u t ϱ( ζ) u ζ =0 ϱ( ζ) is assumed to be Lipschitz continuous. Asymptotic estimates are obtained for Green's function and the “difference step” for difference schemes of maximum odd order of accuracy 2 k−1, k= O(lnτ−1), τ is the time step. Th...

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Bibliographic Details
Published in:U.S.S.R. computational mathematics and mathematical physics 1984, Vol.24 (4), p.33-42
Main Author: Serdyukov, S.I.
Format: Article
Language:English
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Summary:A study is made of the elementary hyperbolic equation u t ϱ( ζ) u ζ =0 ϱ( ζ) is assumed to be Lipschitz continuous. Asymptotic estimates are obtained for Green's function and the “difference step” for difference schemes of maximum odd order of accuracy 2 k−1, k= O(lnτ−1), τ is the time step. The natural constraint g9( ζ) τ/ h⩽1 is imposed on the ratio of mesh steps. The basic asymptotic estimates are obtained by the saddle-point method. The main difficulty lies in the fact that, with n⪢ k ω , the integrand contains, instead of the power of a single function, as in the case of constant coefficients, the product of essentially different factors. Using the Lipschitz continuity, we obtain estimates in L 1, close to optimal, and identical with the estimates for the case of constant coefficients.
ISSN:0041-5553
DOI:10.1016/0041-5553(84)90227-1