论文信息 - ON THE WAVELET OPTIMIZED FINITE DIFFERENCE METHOD

ON THE WAVELET OPTIMIZED FINITE DIFFERENCE METHOD

When one considers the effect in the physical space, Daubechies-based wavelet methods are equivalent to finite difference methods with grid refinement in regions of the domain where small scale structure exists. Adding a wavelet basis function at a given scale and location where one has a correspondingly large wavelet coefficient is, essentially, equivalent to adding a grid point, or two, at the same location and at a grid density which corresponds to the wavelet scale. This paper introduces a wavelet-optimized finite difference method which is equivalent to a wavelet method in its multiresolution approach but which does not suffer from difficulties with nonlinear terms and boundary conditions, since all calculations are done in the physical space. With this method one can obtain an arbitrarily good approximation to a conservative difference method for solving nonlinear conservation laws.

Leland Jameson | L. Jameson

[1] Leland Jameson,et al. The Differentiation Matrix for Daubechies-Based Wavelets on an Interval , 1996, SIAM J. Sci. Comput..

[2] I. Daubechies. Orthonormal bases of compactly supported wavelets , 1988 .

[3] G. Beylkin,et al. On the representation of operators in bases of compactly supported wavelets , 1992 .

[4] D. Esteban,et al. Application of quadrature mirror filters to split band voice coding schemes , 1977 .

[5] D. Gottlieb,et al. The Stability of Numerical Boundary Treatments for Compact High-Order Finite-Difference Schemes , 1993 .

[6] Bertil Gustafsson,et al. On the Superconvergence of Galerkin Methods for Hyperbolic IBVP , 1996 .

[7] Jacques Liandrat,et al. Resolution of the 1D regularized Burgers equation using a spatial wavelet approximation , 1990 .

[8] Leland Jameson,et al. On the spline-based wavelet differentiation matrix , 1995 .

[9] I. Daubechies,et al. Wavelets on the Interval and Fast Wavelet Transforms , 1993 .