triangle_symq_rule


triangle_symq_rule, a FORTRAN77 code which returns symmetric quadrature rules, with exactness up to total degree 50, over the interior of an arbitrary triangle in 2D, by Hong Xiao and Zydrunas Gimbutas.

The original source code, from which this library was developed, is available from the Courant Mathematics and Computing Laboratory, at https://www.cims.nyu.edu/cmcl/quadratures/quadratures.html ,

Licensing:

The computer code and data files made available on this web page are distributed under the MIT license

Languages:

triangle_symq_rule is available in a C version and a C++ version and a Fortran90 version and a MATLAB version and an Octave version and a Python version.

Related Data and Programs:

triangle_symq_rule_test

cube_felippa_rule, a FORTRAN77 library which returns a Felippa quadrature rule over the interior of a cube in 3D.

gnuplot, FORTRAN77 programs which illustrate how a program can write data and command files so that gnuplot() can create plots of the program results.

pyramid_felippa_rule, a FORTRAN77 library which returns a Felippa quadrature rule for approximating integrals over the interior of a pyramid in 3D.

pyramid_rule, a FORTRAN77 program which computes a quadrature rule over the interior of the unit pyramid in 3D;

simplex_gm_rule, a FORTRAN77 library which defines a Grundmann-Moeller quadrature rule over the interior of a simplex in M dimensions.

square_felippa_rule, a FORTRAN77 library which returns a Felippa quadrature rule over the interior of a square in 2D.

square_symq_rule, a FORTRAN77 library which returns symmetric quadrature rules, with exactness up to total degree 20, over the interior of the symmetric square in 2D, by Hong Xiao and Zydrunas Gimbutas.

stroud, a FORTRAN77 library which defines quadrature rules for a variety of M-dimensional regions, including the interior of the square, cube and hypercube, the pyramid, cone and ellipse, the hexagon, the M-dimensional octahedron, the circle, sphere and hypersphere, the triangle, tetrahedron and simplex, and the surface of the circle, sphere and hypersphere.

tetrahedron_felippa_rule, a FORTRAN77 library which returns a Felippa quadrature rule for approximating integrals over the interior of a tetrahedron in 3D.

toms886, a FORTRAN77 library which defines the Padua points for interpolation in a 2D region, including the rectangle, triangle, and ellipse, by Marco Caliari, Stefano de Marchi, Marco Vianello. This is a version of ACM TOMS algorithm 886.

triangle_exactness, a FORTRAN77 program which investigates the monomial exactness quadrature rule over the interior of a triangle in 2D.

triangle_felippa_rule, a FORTRAN77 library which returns a Felippa quadrature rule for approximating integrals over the interior of a triangle in 2D.

triangle_integrals, a FORTRAN77 library which returns the exact value of the integral of any monomial over the interior of the unit triangle in 2D.

triangle_monte_carlo, a FORTRAN77 library which uses the Monte Carlo method to estimate the integral of a function over the interior of the unit triangle in 2D.

wedge_felippa_rule, a FORTRAN77 library which returns a Felippa quadrature rule for approximating integrals over the interior of the unit wedge in 3D.

Reference:

  1. Hong Xiao, Zydrunas Gimbutas,
    A numerical algorithm for the construction of efficient quadrature rules in two and higher dimensions,
    Computers and Mathematics with Applications,
    Volume 59, 2010, pages 663-676.

Source Code:


Last revised on 10 July 2023.