# Matlab vs Mathematica, eigenvectors?

``````function H = calcHyperlinkMatrix(M)
[r c] = size(M);
H = zeros(r,c);
for i=1:r,
for j=1:c,
if (M(j,i) == 1)
colsum = sum(M,2);
H(i,j) = 1 / colsum(j);
end;
end;
end;
H

function V = pageRank(M)
[V D] = eigs(M,1);
V

R

M=[[0 1 1 0 0 0 0 0];[0 0 0 1 0 0 0 0];[0 1 0 0 1 0 0 0];[0 1 0 0 1 1 0 0];
[0 0 0 0 0 1 1 1];[0 0 0 0 0 0 0 1];[1 0 0 0 1 0 0 1];[0 0 0 0 0 1 1 0];]

ans =

-0.1400
-0.1576
-0.0700
-0.1576
-0.2276
-0.4727
-0.4201
-0.6886
``````

### Mathematica:

``````calculateHyperlinkMatrix[linkMatrix_] := {
H = Table[0, {a, 1, r}, {b, 1, c}];
For[i = 1, i < r + 1, i++,
For[j = 1, j < c + 1, j++,
0]
]
];
H
}

H = {{0, 0, 0, 0, 0, 0, 1/3, 0}, {1/2, 0, 1/2, 1/3, 0, 0, 0, 0}, {1/2,
0, 0, 0, 0, 0, 0, 0}, {0, 1, 0, 0, 0, 0, 0, 0}, {0, 0, 1/2, 1/3,
0, 0, 1/3, 0}, {0, 0, 0, 1/3, 1/3, 0, 0, 1/2}, {0, 0, 0, 0, 1/3,
0, 0, 1/2}, {0, 0, 0, 0, 1/3, 1, 1/3, 0}};
R = Eigensystem[H];
VR = {R[[1, 1]], R[[2, 1]]}
PageRank = VR[[2]]

{1, {12/59, 27/118, 6/59, 27/118, 39/118, 81/118, 36/59, 1}}
``````

Matlab and Mathematica doesn't give the same eigenvector with the eigenvalue 1. Both works though...which one is correct and why are they different? How do I gte all eigenvectors with the eigenvalue 1?

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there is a lot of unnecessary code in your post, which only stands in a way of getting to the heart of your question. Can you trim it, please – Sasha Apr 13 '11 at 12:21
This may better asked at: math.stackexchange.com – Dan Andrews Apr 13 '11 at 12:24
Eigenvectors are not unique, take identity matrix -- any vector will be an eigenvector with eigenvalue 1 – Yaroslav Bulatov Apr 13 '11 at 18:48

The Definition of an Eigenvector `X` is some vector `X` that satisfies

`AX = kX`

where `A` is a matrix and `k` is a constant. It is pretty clear from the definition that `cX` is also an Eigenvector for any `c` not equal to `0`. So there is some constant `c` such that `X_matlab = cX_mathematica`.

It looks like the first is normal (has Euclidean length 1, i.e. add the sums of the squares of the coordinates then take the square root and you will get 1) and the second is normalised so that the final coordinate is 1 (any Eigenvector was found and then all coordinates were divided by the final coordinate).

You can use whichever one you want, if all you need is an Eigenvector.

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Also, if one tells Mathematica to analyze numerically, it normalizes to norm 1, just as MATLAB (they use the same iterative method, which by its nature normalizes the eigenvectors in each step). – Daniel Andersson Apr 13 '11 at 12:35
Should be "So there is some constant c such that X_matlab = c * X_mathematica.", for clarity. – Daniel Andersson Apr 13 '11 at 12:37

This is because if a vector x is an eigenvector of matrix H, so is any multiple of the x. Vector you quote as an answer for matlab does not quite check:

``````In[41]:= H.matlab - matlab

Out[41]= {-0.0000333333, 0.0000666667, 0., 0., 0.0000333333, 0., \
-0.0000666667, 0.}
``````

But assuming it is close enough, you see that

``````In[43]:= {12/59, 27/118, 6/59, 27/118, 39/118, 81/118, 36/59,
1}/{-0.1400, -0.1576, -0.0700, -0.1576,
-0.2276, -0.4727, -0.4201, -0.6886}

Out[43]= {-1.45278, -1.45186, -1.45278, -1.45186, -1.45215, -1.45217, \
-1.45244, -1.45222}
``````

consists of almost the same elements. Thus matlab's vector is -1.45 multiple of Mathematica's.

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Sorry, I did the same and posted it a few seconds after you. Deleting my answer :) – Dr. belisarius Apr 13 '11 at 15:45

Eigenvectors are not necessarily unique. All that is required of an eigenvector is that

1. It must have unit norm
2. `v_m*v_n=0` for all `m ≠ n` (orthogonality)
3. It satisfies `Av_m=u_m v_m`, where `u_m` is the corresponding eigenvalue

The exact eigenvectors returned depends on the algorithm implemented. As a simple example to demonstrate that one matrix can have two different sets of eigenvectors, consider an `NxN` identity matrix:

``````I=   1     0     0     0
0     1     0     0
...   ...   ...   ...
0     0     0     1
``````

It is obvious (and can be easily confirmed) that each column of `I` is an eigenvector and the eigenvalues are all 1.

I now state that the following vectors

``````v_m=[1,exp(2*pi*1i*m/N),...,exp(2*pi*1i*m*(N-1)/N)]';
``````

for `m=1,2...,N` form an orthogonal basis set with norm 1, and hence are the eigenvectors of `I`. Here `1i` refers to square root of `-1` in MATLAB notation. You can verify this for yourself:

``````N=50;
v=1/sqrt(N)*cumprod(repmat(exp(-1i*2*pi/N*(0:N-1)),N,1),1);
imagesc(real(v*v'));
``````

Here I've taken the real part because the imaginary part is non-zero (of order `10^-16`)due to machine precision effects, but should be zero (you can even do this analytically and it should be zero). `imagesc` returns an error otherwise.

So, to sum up, eigenvectors are not necessarily unique and both convey the same information; just in different representations.

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