program main !*****************************************************************************80 ! !! sphere_triangle_monte_carlo_test() tests sphere_triangle_monte_carlo(). ! ! Licensing: ! ! This code is distributed under the MIT license. ! ! Modified: ! ! 10 October 2010 ! ! Author: ! ! John Burkardt ! implicit none call timestamp ( ) write ( *, '(a)' ) ' ' write ( *, '(a)' ) 'sphere_triangle_monte_carlo_test():' write ( *, '(a)' ) ' FORTRAN90 version' write ( *, '(a)' ) ' Test sphere_triangle_monte_carlo().' call test01 ( ) ! ! Terminate. ! write ( *, '(a)' ) ' ' write ( *, '(a)' ) 'sphere_triangle_monte_carlo_test():' write ( *, '(a)' ) ' Normal end of execution.' write ( *, '(a)' ) ' ' call timestamp ( ) stop 0 end subroutine test01 ( ) !*****************************************************************************80 ! !! TEST01 uses SPHERE_TRIANGLE_SAMPLE_01 with an increasing number of points. ! ! Licensing: ! ! This code is distributed under the MIT license. ! ! Modified: ! ! 16 August 2009 ! ! Author: ! ! John Burkardt ! implicit none integer, parameter :: rk = kind ( 1.0D+00 ) integer, parameter :: m = 3 real ( kind = rk ) area integer e(m) integer :: e_test(m,7) = reshape ( (/ & 0, 0, 0, & 2, 0, 0, & 0, 2, 0, & 0, 0, 2, & 4, 0, 0, & 2, 2, 0, & 0, 0, 4 /), (/ m, 7 /) ) integer j integer k integer n real ( kind = rk ), parameter :: pi = 3.1415926535897932384626434D+00 real ( kind = rk ) result(7) integer seed real ( kind = rk ) shrink real ( kind = rk ) v1(m) real ( kind = rk ) v2(m) real ( kind = rk ) v3(m) real ( kind = rk ) wc(m) real ( kind = rk ) w1(m) real ( kind = rk ) w2(m) real ( kind = rk ) w3(m) real ( kind = rk ), allocatable :: value(:) real ( kind = rk ), allocatable :: x(:,:) write ( *, '(a)' ) ' ' write ( *, '(a)' ) 'TEST01' write ( *, '(a)' ) ' Estimate monomial integrals over a sphere triangle' write ( *, '(a)' ) ' using the Monte Carlo method.' seed = 123456789 ! ! Choose three points at random to define a spherical triangle. ! call sphere01_sample ( 1, seed, w1 ) call sphere01_sample ( 1, seed, w2 ) call sphere01_sample ( 1, seed, w3 ) wc(1:m) = ( w1(1:m) + w2(1:m) + w3(1:m) ) / 3.0D+00 call r8vec_normalize ( m, wc ) ! ! Shrink triangle by factor F. ! shrink = 2.0D+00 do k = 1, 3 shrink = shrink / 2.0D+00 v1(1:m) = wc(1:m) + shrink * ( w1(1:m) - wc(1:m) ) v2(1:m) = wc(1:m) + shrink * ( w2(1:m) - wc(1:m) ) v3(1:m) = wc(1:m) + shrink * ( w3(1:m) - wc(1:m) ) call r8vec_normalize ( m, v1 ) call r8vec_normalize ( m, v2 ) call r8vec_normalize ( m, v3 ) call sphere01_triangle_vertices_to_area ( v1, v2, v3, area ) write ( *, '(a)' ) ' ' write ( *, '(a)' ) ' Vertices of random spherical triangle' write ( *, '(a,g14.6)' ) ' with shrink factor = ', shrink write ( *, '(a,g14.6)' ) ' and area = ', area write ( *, '(a)' ) ' ' write ( *, '(a,3g14.6)' ) ' V1:', v1(1:m) write ( *, '(a,3g14.6)' ) ' V2:', v2(1:m) write ( *, '(a,3g14.6)' ) ' V3:', v3(1:m) ! ! Estimate integrals. ! write ( *, '(a)' ) ' ' write ( *, '(a)' ) ' N 1 X^2 Y^2' // & ' Z^2 X^4 X^2Y^2 Z^4' write ( *, '(a)' ) ' ' n = 1 do while ( n <= 4 * 65536 ) allocate ( value(1:n) ) allocate ( x(1:m,1:n) ) call sphere01_triangle_sample ( n, v1, v2, v3, seed, x ) do j = 1, 7 e(1:m) = e_test(1:m,j) call monomial_value ( m, n, e, x, value ) result(j) = area * sum ( value(1:n) ) / real ( n, kind = rk ) end do write ( *, '(2x,i8,7(2x,g14.6))' ) n, result(1:7) deallocate ( value ) deallocate ( x ) n = 2 * n end do end do return end