I want to solve a differential equation lots of times for different parameters. It is more complicated than this, but for the sake of clarity let's say the ODE is `y'(x) = (y+a)*x`

with `y(0) = 0`

and I want `y(1)`

. I picked the dverk algorithm from netlib for solving the ODE and it expects the function on the right hand side to be of a certain form. Now what I did with the Intel Fortran compiler is the following (simplified):

```
subroutine f(x,a,ans)
implicite none
double precision f,a,ans,y,tol,c(24),w(9)
...
call dverk(1,faux,x,y,1.d0,tol,ind,c,1,w)
...
contains
subroutine faux(n,xx,yy,yprime)
implicite none
integer n
double precision xx,yy(n),yprime(n)
yprime(1) = (yy(1)+a)*xx
end subroutine faux
end subroutine f
```

This works just fine with ifort, the sub-subroutine `faux`

sees the parameter `a`

and everything works as expected. But I'd like the code to be compatible with gfortran, and with this compiler I get the following error message:

Error: Internal procedure 'faux' is not allowed as an actual argument at (1)

I need to have the `faux`

routine inside `f`

, or else I don't know how to tell it the value of `a`

, because I can't change the list of parameters, since this is what the `dverk`

routine expects.

I would like to keep the `dverk`

routine and understand how to solve this specific problem without a workaround, since I feel it will become important again when I need to integrate a parameterized function with different integrators.