论文信息 - The pseudospectral method for third-order differential equations

The pseudospectral method for third-order differential equations

Generalized quadrature rules are derived which assist in the selection of collocation points for the pseudospectral solution of differential equations. In particular, it is shown that for an nth-order differential equation in one space dimension with two-point derivative boundary conditions, an ideal choice of interior collocation points is the set of zeros of a Jacobi polynomial. The pseudospectral solution of a third-order initial-boundary value problem is considered and accuracy is assessed by examining how well the discrete eigenproblem approximates the continuous one. Convergence is established for a special choice of collocation points and numerical results are included to demonstrate the viability of the approach.

Weizhang Huang | Weizhang Huang | D. M. Sloan

[1] T. A. Zang,et al. Spectral methods for fluid dynamics , 1987 .

[2] A. Stroud,et al. Approximate Calculation of Integrals , 1962 .

[3] D. Gottlieb,et al. Numerical analysis of spectral methods : theory and applications , 1977 .

[4] A. Erdélyi,et al. Tables of integral transforms , 1955 .

[5] Steven A. Orszag,et al. CBMS-NSF REGIONAL CONFERENCE SERIES IN APPLIED MATHEMATICS , 1978 .

[6] L. Trefethen,et al. THE EIGENVALUES OF SECOND-ORDER SPECTRAL DIFFERENTIATION MATRICES* , 1988 .

[7] Henry E. Fettis,et al. Erratum: Tables of integral transforms. Vol. I, II (McGraw-Hill, New York, 1954) by A. Erdélyi, W. Magnus, F. Oberhettinger and F. G. Tricomi , 1973 .

[8] L. Trefethen. Approximation theory and numerical linear algebra , 1990 .

[9] G. Golub,et al. Calculation of Gauss quadratures with multiple free and fixed knots , 1983 .