I converted a written code in fortran 77 to Matlab code. This function computes the eigenvalues and eigenvectors of a matrix using QL algorithm. for some reasons I can't use the eig function's result in matlab. The obtained eigenvalues from this method is not identical to those obtained by eig function, some of them are the same but some differs. I don't know where is the problem. Thank you for any help and suggestion. I can give the input arrays, if needed for running and watching the results.

here is the fortran code:

```
SUBROUTINE tqli(d,e,n,np,z)
INTEGER n,np
REAL d(np),e(np),z(np,np)
CU USES pythag
INTEGER i,iter,k,l,m
REAL b,c,dd,f,g,p,r,s,pythag
do 11 i=2,n
e(i-1)=e(i)
11 continue
e(n)=0.
do 15 l=1,n
iter=0
1 do 12 m=l,n-1
dd=abs(d(m))+abs(d(m+1))
if (abs(e(m))+dd.eq.dd) goto 2
12 continue
m=n
2 if(m.ne.l)then
if(iter.eq.30)pause 'too many iterations in tqli'
iter=iter+1
g=(d(l+1)-d(l))/(2.*e(l))
r=pythag(g,1.)
g=d(m)-d(l)+e(l)/(g+sign(r,g))
s=1.
c=1.
p=0.
do 14 i=m-1,l,-1
f=s*e(i)
b=c*e(i)
r=pythag(f,g)
e(i+1)=r
if(r.eq.0.)then
d(i+1)=d(i+1)-p
e(m)=0.
goto 1
endif
s=f/r
c=g/r
g=d(i+1)-p
r=(d(i)-g)*s+2.*c*b
p=s*r
d(i+1)=g+p
g=c*r-b
C Omit lines from here ...
do 13 k=1,n
f=z(k,i+1)
z(k,i+1)=s*z(k,i)+c*f
z(k,i)=c*z(k,i)-s*f
13 continue
C ... to here when finding only eigenvalues.
14 continue
d(l)=d(l)-p
e(l)=g
e(m)=0.
goto 1
endif
15 continue
return
END
```

and the following is the matlab code:

```
function [d,z]=tqli(d,e,n,np,z)
for i=2:n
e(i-1)=e(i);
end
e(n)=0.;
for l=1:n
iter=0;
for m=l:(n-1)
dd=abs(d(m))+abs(d(m+1));
if ((abs(e(m))+dd)==dd)
break
end
end
m=n;
if (m~=l)
if (iter==30)
disp('too many iteration in tqli')
end
iter=iter+1;
g=(d(l+1)-d(l))/(2.*e(l));
r=pythag(g,1.);
g=d(m)-d(l)+e(l)/(g+r*sign(g));
s=1.;
c=1.;
p=0.;
for i=(m-1):-1:l
f=s*e(i);
b=c*e(i);
r=pythag(f,g);
e(i+1)=r;
if(r==0.)
d(i+1)=d(i+1)-p;
e(m)=0.;
break
end
s=f/r;
c=g/r;
g=d(i+1)-p;
r=(d(i)-g)*s+2.*c*b;
p=s*r;
d(i+1)=g+p;
g=c*r-b;
for k=1:n
f=z(k,i+1);
z(k,i+1)=s*z(k,i)+c*f;
z(k,i)=c*z(k,i)-s*f;
end
end
d(l)=d(l)-p;
e(l)=g;
e(m)=0.;
end
end
end
```