Title of article
ENO adaptive method for solving one-dimensional conservation laws
Author/Authors
Raimund and Kozakevicius، نويسنده , , A.J. and Santos، نويسنده , , L.C.C.، نويسنده ,
Issue Information
روزنامه با شماره پیاپی سال 2009
Pages
19
From page
2337
To page
2355
Abstract
In this work an efficient third order non-linear finite difference scheme for solving adaptively hyperbolic systems of one-dimensional conservation laws is developed. The method is based on applying to the solution of the differential equation an interpolating wavelet transform at each time step, generating a multilevel representation for the solution, which is thresholded and a sparse point representation is generated. The numerical fluxes obtained by a Lax–Friedrichs flux splitting are evaluated on the sparse grid by an essentially non-oscillatory (ENO) approximation, which chooses the locally smoothest stencil among all the possibilities for each point of the sparse grid. The time evolution of the differential operator is done on this sparse representation by a total variation diminishing (TVD) Runge–Kutta method. Four classical examples of initial value problems for the Euler equations of gas dynamics are accurately solved and their sparse solutions are analyzed with respect to the threshold parameters, confirming the efficiency of the wavelet transform as an adaptive grid generation technique.
Keywords
Thresholded wavelet transform , Euler equations for gas dynamics , Multiresolution schemes , ENO scheme
Journal title
Applied Numerical Mathematics
Serial Year
2009
Journal title
Applied Numerical Mathematics
Record number
1529313
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