论文信息 - Quadratic spline quasi-interpolants and collocation methods

Quadratic spline quasi-interpolants and collocation methods

Univariate and multivariate quadratic spline quasi-interpolants provide interesting approximation formulas for derivatives of approximated functions that can be very accurate at some points thanks to the superconvergence properties of these operators. Moreover, they also give rise to good global approximations of derivatives on the whole domain of definition. From these results, some collocation methods are deduced for the solution of ordinary or partial dierential equations with boundary conditions. Their convergence properties are illustrated and compared with finite dierence methods on some numerical examples of elliptic boundary value problems.

Jean Leray | J. Leray

[1] Martin D. Buhmann,et al. Boolean methods in interpolation and approximation , 1990, Acta Applicandae Mathematicae.

[2] Paul Sablonnière,et al. Approximating partial derivatives of first and second order by quadratic spline quasi-interpolants on uniform meshes , 2008, Math. Comput. Simul..

[3] L. Schumaker. Spline Functions: Basic Theory , 1981 .

[4] Bengt Fornberg,et al. A practical guide to pseudospectral methods: Introduction , 1996 .

[5] Paul Sablonnière,et al. Recent Progress on Univariate and Multivariate Polynomial and Spline Quasi-interpolants , 2005 .

[6] Ward Cheney,et al. A course in approximation theory , 1999 .

[7] Paul Sablonniere. Univariate spline quasi-interpolants and applications to numerical analysis , 2005 .

[8] Paul Sablonnière,et al. Superconvergence properties of some bivariate $C\sp 1$ quadratic spline quasi-interpolants , 2006 .

[9] L. Trefethen. Spectral Methods in MATLAB , 2000 .

[10] B. Fornberg,et al. A review of pseudospectral methods for solving partial differential equations , 1994, Acta Numerica.

[11] L. Schumaker,et al. Local Spline Approximation Methods , 1975 .