| ! { dg-do run { xfail spu-*-* } } |
| ! { dg-add-options ieee } |
| ! |
| ! PR fortran/36158 |
| ! PR fortran/33197 |
| ! |
| ! XFAILed for SPU targets since we don't have an accurate library |
| ! implementation of the single-precision Bessel functions. |
| ! |
| ! Run-time tests for transformations BESSEL_JN |
| ! |
| implicit none |
| real,parameter :: values(*) = [0.0, 0.5, 1.0, 0.9, 1.8,2.0,3.0,4.0,4.25,8.0,34.53, 475.78] |
| real,parameter :: myeps(size(values)) = epsilon(0.0) & |
| * [2, 7, 5, 6, 9, 12, 12, 7, 7, 8, 92, 15 ] |
| ! The following is sufficient for me - the values above are a bit |
| ! more tolerant |
| ! * [0, 5, 3, 4, 6, 7, 7, 5, 5, 6, 66, 4 ] |
| integer,parameter :: mymax(size(values)) = & |
| [100, 17, 23, 21, 27, 28, 32, 35, 36, 41, 47, 37 ] |
| integer, parameter :: Nmax = 100 |
| real :: rec(0:Nmax), lib(0:Nmax) |
| integer :: i |
| |
| do i = 1, ubound(values,dim=1) |
| call compare(mymax(i), values(i), myeps(i)) |
| end do |
| |
| contains |
| |
| subroutine compare(mymax, X, myeps) |
| |
| integer :: i, nit, mymax |
| real X, myeps, myeps2 |
| |
| rec(0:mymax) = BESSEL_JN(0, mymax, X) |
| lib(0:mymax) = [ (BESSEL_JN(i, X), i=0,mymax) ] |
| |
| !print *, 'YN for X = ', X, ' -- Epsilon = ',epsilon(x) |
| do i = 0, mymax |
| ! print '(i2,2e17.9,e12.2,f18.10,2l3)', i, rec(i), lib(i), & |
| ! rec(i)-lib(i), ((rec(i)-lib(i))/rec(i))/epsilon(x), & |
| ! rec(i) == lib(i) .or. abs((rec(i)-lib(i))/rec(i)) < myeps |
| if (.not. (rec(i) == lib(i) .or. abs((rec(i)-lib(i))/rec(i)) < myeps)) & |
| call abort() |
| end do |
| |
| end |
| end |
