When you use the "computational" routines in Lapack, you have greater control over the individual phases of the computation, but you also take on the responsibility to understand what each routine does and how to use them in the correct sequence. I do not know what your real objective is (beyond this simple 2 X 2 matrix example), but here is your program, corrected:
program comp
USE lapack95
implicit none
integer i
real, dimension(2,2) :: A
real, dimension(2) :: tau, d
real, dimension(1) :: e
A = reshape((/-5., 2., 2., -2./),(/2,2/))
call sytrd(A, tau)
do i=1,2
d(i)=A(i,i)
end do
e(1)=A(1,2)
call rsteqr(d, e)
write(*,*) d
end program comp
When run, it gives the eigenvalues as -1, -6, which I can check by hand.
