An algorithm for numerical integration based on quasi-interpolating splines
暂无分享,去创建一个
[1] P. Rabinowitz. Numerical integration based on approximating splines , 1990 .
[2] Philip Rabinowitz,et al. Methods of Numerical Integration , 1985 .
[3] Catterina Dagnino,et al. Product integration of piecewise continuous integrands based on cubic splineinterpolation at equally spaced nodes , 1988 .
[4] Catterina Dagnino,et al. On the convergence of spline product quadratures for Cauchy principal value integrals , 1991 .
[5] Catterina Dagnino,et al. Product integration of singular integrands based on cubic spline interpolation at equally spaced nodes , 1990 .
[6] L. Schumaker,et al. Local Spline Approximation Methods , 1975 .
[7] P. Rabinowitz. The convergence of interpolatory product integration rules , 1986 .
[8] Apostolos Gerasoulis,et al. Piecewise-polynomial quadratures for Cauchy singular integrals , 1986 .
[9] Catterina Dagnino,et al. Numerical integration based on quasi-interpolating splines , 1993, Computing.
[10] Ayse Alaylioglu,et al. Product integration of logarithmic singular integrands based on cubic splines , 1984 .
[11] Catterina Dagnino,et al. Spline product quadrature rules for Cauchy singular integrals , 1990 .
[12] Carl de Boor,et al. A Practical Guide to Splines , 1978, Applied Mathematical Sciences.
[13] Catterina Dagnino,et al. Product integration of singular integrands using quasi-interpolatory splines , 1997 .
[14] Catterina Dagnino,et al. On the evaluation of one-dimensional Cauchy principal value integrals by rules based on cubic spline interpolation , 1990, Computing.