# pyramid_exactness

pyramid_exactness, an Octave code which measures the precision of a quadrature rule defined over the interior of a pyramid in 3D.

The integration region is:

```       - ( 1 - Z ) <= X <= 1 - Z
- ( 1 - Z ) <= Y <= 1 - Z
0 <= Z <= 1.
```
When Z is zero, the integration region is a square lying in the (X,Y) plane, centered at (0,0,0) with "radius" 1. As Z increases to 1, the radius of the square diminishes, and when Z reaches 1, the square has contracted to the single point (0,0,1).

### Usage:

pyramid_exactness ( 'filename', degree_max )
where
• 'filename' is the common prefix of the filenames containing the abscissas and the weights of the quadrature rule.
• degree_max is the maximum degree of the monomials to be checked.

### Licensing:

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

### Languages:

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

### Related Data and Programs:

cube_exactness, an Octave code which investigates the polynomial exactness of quadrature rules over the interior of a cube in 3d.

hypercube_exactness, an Octave code which measures the monomial exactness of an m-dimensional quadrature rule over the interior of the unit hypercube in m dimensions.

pyramid_felippa_rule, an Octave code which returns a Felippa quadrature rule for approximating integrals over the interior of a pyramid in 3d.

pyramid_grid, an Octave code which computes a grid of points over the interior of the unit pyramid in 3d;

pyramid_integrals, an Octave code which returns the exact value of the integral of any monomial over the interior of the unit pyramid in 3d.

pyramid_jaskowiec_rule, an Octave code which returns quadrature rules, with exactness up to total degree 20, over the interior of a pyramid in 3D, by Jan Jaskowiec, Natarajan Sukumar.

pyramid_monte_carlo, an Octave code which applies a Monte Carlo method to estimate integrals of a function over the interior of the unit pyramid in 3d;

pyramid_rule, an Octave code which computes a quadrature rule over the interior of the unit pyramid in 3d.

pyramid_witherden_rule, an Octave code which returns a Witherden quadrature rule, with exactness up to total degree 10, over the interior of a pyramid in 3D.

quadrature_rules_pyramid, a dataset directory which contains quadrature rules over the interior of the unit pyramid in 3d.

sphere_exactness, an Octave code which tests the polynomial exactness of a quadrature rule over the surface of the unit sphere in 3d.

square_exactness, an Octave code which investigates the polynomial exactness of quadrature rules for f(x,y) over the interior of a square (rectangle/quadrilateral) in 2d.

tetrahedron_exactness an Octave code which investigates the polynomial exactness of a quadrature rule over the interior of a tetrahedron in 3d.

triangle_exactness, an Octave code which investigates the monomial exactness quadrature rule over the interior of a triangle in 2d.

wedge_exactness, an Octave code which investigates the monomial exactness of a quadrature rule over the interior of the unit wedge in 3d.

### Reference:

1. Carlos Felippa,
A compendium of FEM integration formulas for symbolic work,
Engineering Computation,
Volume 21, Number 8, 2004, pages 867-890.
2. Arthur Stroud,
Approximate Calculation of Multiple Integrals,
Prentice Hall, 1971,
ISBN: 0130438936,
LC: QA311.S85.

### Source Code:

Last revised on 26 April 2023.