Take the 2-minute tour ×
Stack Overflow is a question and answer site for professional and enthusiast programmers. It's 100% free, no registration required.

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,
 $   numExperiments,readsize,numAbsent,count,geneTolerance

  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?

share|improve this question

3 Answers 3

up vote 3 down vote accepted

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
share|improve this answer

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.

share|improve this answer

SSYTRD/DSYTRD only works for the symmetric matrix.

share|improve this answer

Your Answer

 
discard

By posting your answer, you agree to the privacy policy and terms of service.

Not the answer you're looking for? Browse other questions tagged or ask your own question.