On product integration rules for highly oscillatory integrals on a triangle
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[1] Junjie Ma,et al. Efficient Computation of Highly Oscillatory Fourier Transforms with Nearly Singular Amplitudes over Rectangle Domains , 2020, Mathematics.
[2] Donatella Occorsio,et al. Cubature formulae for nearly singular and highly oscillating integrals , 2018 .
[3] A. Iserles,et al. Error analysis of the extended Filon-type method for highly oscillatory integrals , 2017, Research in the Mathematical Sciences.
[4] A. Iserles,et al. A generalization of Filon–Clenshaw–Curtis quadrature for highly oscillatory integrals , 2017 .
[5] Alvise Sommariva,et al. Algebraic cubature by linear blending of elliptical arcs , 2013 .
[6] Yuan Xu,et al. On Gauss-Lobatto Integration on the Triangle , 2010, SIAM J. Numer. Anal..
[7] Daan Huybrechs,et al. The Construction of cubature rules for multivariate highly oscillatory integrals , 2007, Math. Comput..
[8] Sheehan Olver,et al. Numerical approximation of vector-valued highly oscillatory integrals , 2007 .
[9] A. Iserles,et al. On the computation of highly oscillatory multivariate integrals with stationary points , 2006 .
[10] Arieh Iserles,et al. Quadrature methods for multivariate highly oscillatory integrals using derivatives , 2006, Math. Comput..
[11] Daan Huybrechs,et al. On the Evaluation of Highly Oscillatory Integrals by Analytic Continuation , 2006, SIAM J. Numer. Anal..
[12] A. Iserles,et al. Efficient quadrature of highly oscillatory integrals using derivatives , 2005, Proceedings of the Royal Society A: Mathematical, Physical and Engineering Sciences.
[13] A. Iserles,et al. On Quadrature Methods for Highly Oscillatory Integrals and Their Implementation , 2004 .
[14] Mark A. Taylor,et al. An Algorithm for Computing Fekete Points in the Triangle , 2000, SIAM J. Numer. Anal..
[15] T. Sauer,et al. On multivariate Lagrange interpolation , 1995 .
[16] Ronald Cools,et al. A survey of numerical cubature over triangles , 1993 .
[17] Len Bos,et al. On certain configurations of points in R n which are unisolvent for polynomial interpolation , 1991 .