i have a program and i want to implement this with a distribution of initial condition (x0=0.1,0.2,...,1 ; and the same for p0). So i want a 10x10 (or nxn) grid of points. I suppose that i must use a double `DO`

cycle:

```
do x0=0.1,1.0,0.1
do p0=0.1,1.0,0.1
...
enddo
enddo
```

Also i want to read all the different output in a single file (so i have an array of n*3 where n is the number of points).

```
Program Main
Implicit real*8 (A-H,O-Z)
common ome,eps
duepi=8*datan(1.d0)
ome=sqrt(2.d0)
T_per=duepi/ome
eps=0.81
N_step=100
x0=0.4
y0=0
px0=1.0
py0=0
x=x0
y=y0
px=px0
py=py0
dt=T_per/N_step
E0=H(x,y,px,py)
k_max=100*N_step
k=0
t=0
errh=0
c---------
c integration loop
c--------
do k=1,k_max
call sym4(x,y,px,py,dt)
E= H(x,y,px,py)
errh=abs(E-E0)
t=k*dt
if(mod(k,N_step).eq.0) then
xex=x0*cos(t)+px0*sin(t)
pxex=-x0*sin(t)+px0*cos(t)
yex=y0*cos(t)+py0*sin(t)
pyex=-y0*sin(t)+py0*cos(t)
err=sqrt((x-xex)**2+(p-pex)**2+(y-yex)**2+(py-pyex)**2)
endif
enddo
do k=1,k_max
call sym4(x,y,px,py,-dt)
E= H(x,y,px,py)
errh=abs(E-E0)
t=t-dt
if(mod(k,N_step).eq.0) then
xex=cos(t)+sin(t)
pex=-sin(t)+cos(t)
err=sqrt( (x-xex)**2+(p-pex)**2)
endif
enddo
c--------
c if i put the OPEN-WRITE command here i have the last value of the two do cycle but i
c whant to write EVERY last values for every different initial conditions WITHOUT
c OVER-WRITE the file.
c--------
OPEN(unit=11, file="prova0.txt")
write(11,'(I3,8g15.6)') k, x0, px0, errh
end
subroutine f(x,y,fx,fy)
Implicit real*8 (A-H,O-Z)
common ome,eps
fx=-x*(1+eps*cos(ome*y))
fy= eps* ome*sin(ome*y)*x*x/2.d0
return
end
real*8 function H(x,y,px,py)
Implicit real*8 (A-H,O-Z)
common ome,eps
h=px*px/2.d0+ py +(1+eps*cos(ome*y))*x*x/2
return
end
subroutine sym2(x,y,px,py,dt)
Implicit real*8 (A-H,O-Z)
call f(x,y,fx,fy)
xnew= x+ px*dt + fx*dt**2/2.d0
ynew= y+ dt
call f(xnew,ynew,fxnew,fynew)
pxnew= px+ dt*(fx+fxnew )/2.d0
pynew= py+ dt*(fy+fynew )/2.d0
x=xnew
y=ynew
px=pxnew
py=pynew
end
subroutine sym4(x,y,px,py,dt)
Implicit real*8 (A-H,O-Z)
sq2=2**(1.d0/3.d0)
alpha= 1.d0/(2-sq2)
beta= sq2/(2-sq2)
dt1= dt*alpha
dt2=-dt*beta
call sym2(x,y,px,py,dt1)
call sym2(x,y,px,py,dt2)
call sym2(x,y,px,py,dt1)
return
end
```

Thanks a lot for your help !

Neveruse anything else but`integer`

s as loop counters in Fortran (or even FORTRAN). – Alexander Vogt Jan 28 '14 at 22:48