From 554fd8c5195424bdbcabf5de30fdc183aba391bd Mon Sep 17 00:00:00 2001 From: upstream source tree Date: Sun, 15 Mar 2015 20:14:05 -0400 Subject: obtained gcc-4.6.4.tar.bz2 from upstream website; verified gcc-4.6.4.tar.bz2.sig; imported gcc-4.6.4 source tree from verified upstream tarball. downloading a git-generated archive based on the 'upstream' tag should provide you with a source tree that is binary identical to the one extracted from the above tarball. if you have obtained the source via the command 'git clone', however, do note that line-endings of files in your working directory might differ from line-endings of the respective files in the upstream repository. --- gcc/testsuite/gfortran.dg/graphite/pr42180.f90 | 23 +++++++++++++++++++++++ 1 file changed, 23 insertions(+) create mode 100644 gcc/testsuite/gfortran.dg/graphite/pr42180.f90 (limited to 'gcc/testsuite/gfortran.dg/graphite/pr42180.f90') diff --git a/gcc/testsuite/gfortran.dg/graphite/pr42180.f90 b/gcc/testsuite/gfortran.dg/graphite/pr42180.f90 new file mode 100644 index 000000000..bb5bc0c58 --- /dev/null +++ b/gcc/testsuite/gfortran.dg/graphite/pr42180.f90 @@ -0,0 +1,23 @@ +! { dg-options "-ffast-math -O2 -fgraphite-identity" } + +module mcc_m + integer, parameter, private :: longreal = selected_real_kind(15,90) +contains + subroutine mutual_ind_cir_cir_coils (m, l12) + real (kind = longreal), intent(out) :: l12 + real (kind = longreal), dimension(1:9), save :: zw + gauss:do i = 1, 9 + theta_l12 = 0.0_longreal + theta1: do n1 = 1, 2*m + theta_1 = pi*real(n1,longreal)/real(m,longreal) + theta2: do n2 = 1, 2*m + numerator = -sin(theta_1)*tvx + cos(theta_1)*tvy + theta_l12 = theta_l12 + numerator/denominator + end do theta2 + end do theta1 + l12 = l12 + zw(i)*theta_l12 + end do gauss + l12 = coefficient * l12 + end subroutine mutual_ind_cir_cir_coils +end module mcc_m +! { dg-final { cleanup-modules "mcc_m" } } -- cgit v1.2.3