# Fortran and Matlab return different eigenvalues for same matrix

I am trying to learn how to use LaPACK by diagonalizing this simple matrix:

``````0.8147    0.9058    0.1270    0.9134
0.6324    0.0975    0.2785    0.5469
0.9575    0.9649    0.1576    0.9706
0.9572    0.4854    0.8003    0.1419
``````

In matlab, I just use the command, eig(mat), and get the output:

``````ans =

2.4021
-0.0346
-0.7158
-0.4400
``````

However, when I try to write a simple fortran program to diagonalize the same matrix, I get different eigenvalues:

``````      implicit none

real*8, allocatable::dataMat(:,:),dataMatP(:,:),corMat(:,:),
\$   tempMat(:,:),corMat2(:,:)
real*8, allocatable::matList(:),rawData(:)
real*8, allocatable ::eig(:),diag(:),offdiag(:),tau(:),work(:)
real*8 avg1,avg2,SD1,SD2,geneCorSum,genei,genej,temp
integer i,j,k,numElements,info,lwork,numGenes,n,

real*8 mean,std

n=4

allocate(corMat(4,4))

corMat(1,1)=0.8147
corMat(1,2)=0.9058
corMat(1,3)=0.1270
corMat(1,4)=0.9134
corMat(2,1)=0.6234
corMat(2,2)=0.0975
corMat(2,3)=0.2785
corMat(2,4)=0.5469
corMat(3,1)=0.9575
corMat(3,2)=0.9649
corMat(3,3)=0.1576
corMat(3,4)=0.9706
corMat(4,1)=0.9572
corMat(4,2)=0.4854
corMat(4,3)=0.8003
corMat(4,4)=0.1419

allocate(diag(n))
allocate(offdiag(n-1))
allocate(tau(n-1))
allocate(work(1))

call dsytrd('U',n,corMat,n,diag,offdiag,tau,
\$ work,-1,info)
print*,"Returning from Blocksize calculation"
if(info.eq.0) then
print*,"Work value successfully calculated:",work(1)
endif
lwork=work(1)
deallocate(work)
allocate(work(max(1,lwork)))

call dsytrd('U',n,corMat,n,diag,offdiag,tau,
\$ work,lwork,info)
print*,"Returning from full SSYTRD"
if(info.EQ.0) then
print*,"Tridiagonal matrix calculated"
endif

call dsterf(n,diag,offdiag,info)
if(info.EQ.0) then
print*,"Matrix Diagonalized"
endif

do i=1,n
print*,"lam=",i,diag(i)
enddo

deallocate(offdiag)
deallocate(work)
deallocate(tau)

end
``````

This gives me:

`````` lam= 1,  -1.0228376083545221
lam= 2,  -0.48858533844019592
lam= 3,  0.43828991894506536
lam= 4,  2.2848330351691031
``````

Did I do something wrong to get different eigenvalues?

-

The LAPACK routines you have used assume a symmetric matrix whereas the original matrix is not.

To prove this, create a symmetric matrix from your original matrix, using the upper right triangular part and run MATLAB's `eig` function:

``````for i=1:4
for j=i:4;
xx(i,j) = x(i,j);
xx(j,i)=x(i,j);
end
end
``````

The resulting matrix (`x` was the original matrix you had):

``````xx =

0.8147    0.9058    0.1270    0.9134
0.9058    0.0975    0.2785    0.5469
0.1270    0.2785    0.1576    0.9706
0.9134    0.5469    0.9706    0.1419
``````

And the eigenvalues of the original `x` and the symmetric `xx` matrices:

``````>> eig(x)
ans =    2.4022    -0.0346   -0.7158   -0.4400

>> eig(xx)
ans =   -1.0228    -0.4886     0.4383     2.2848
``````
-

To begin with, I hope that you're not just copy/pasting the four decimal places that Matlab prints out the command window by default. Second, `corMat(2,1)=0.6234` is different from the corresponding value in your first matrix. Thirdly, the documentation for `dsytrd` states:

DSYTRD reduces a real symmetric matrix A to real symmetric tridiagonal form T by an orthogonal similarity transformation ...

Your matrix is definitely not symmetric (`isequal(A,A')`). There are are variety of routines that handle non symmetric matrices. You might try `dgeev`, for example.

-

`SSYTRD/DSYTRD` only works for the symmetric matrix.

-