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How does one solve the (non-trivial) solution Ax = 0 for x in MATLAB?

A = matrix
x = matrix trying to solve for

I've tried solve('A * x = 0', 'x') but I only get 0 for an answer.

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1  
is A invertible? –  manji Oct 4 '09 at 1:10
2  
invertibility isn't particularly relevant (by itself). –  Peter Oct 4 '09 at 1:16
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if A is invertible, the only solution to Ax=0 is 0, no? –  manji Oct 4 '09 at 1:22
    
true, but this is a limited, special-case answer to a more general problem. –  Peter Oct 4 '09 at 1:24

3 Answers 3

up vote 9 down vote accepted

Please note that null(A) does the same thing (for a rank-deficient matrix) as the following, but this is using the svd(A) function in MATLAB (which as I've mentioned in my comments is what null(A) does).

[U S V] = svd(A);
x = V(:,end)

For more about this, here's an link related to this (can't post it to here due to the formulae).

If you want a more intuitive feel of singular and eigenvalue decompositions check out eigshow in MATLAB.

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thanks for the explanation :) –  yxk Oct 5 '09 at 22:50

You can use N = null(A) to get a matrix N. Any of the columns of N (or, indeed, any linear combination of columns of N) will satisfy Ax = 0. This describes all possible such x - you've just found an orthogonal basis for the nullspace of A.

Note: you can only find such an x if A has non-trivial nullspace. This will occur if rank(A) < #cols of A.

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My rank(A) = # cols. How does one "lessen" the value of the rank ? Also null(A) = Empty matrix: 12-by-0. –  yxk Oct 4 '09 at 20:04
    
You should look into low rank approximations. You can use the SVD for this. –  Peter Oct 4 '09 at 22:16

You can see if MATLAB has a singular value decomposition in its toolbox. That will give you the null space of the vector.

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That would be SVD, which results in the same result as null(A). –  Jacob Oct 4 '09 at 5:26
    
They use different numerical methods. –  Peter Oct 4 '09 at 10:27
    
Not really, null(A) uses svd - mathworks.com/access/helpdesk/help/techdoc/index.html?/access/… –  Jacob Oct 4 '09 at 15:37
    
My apologies. I assumed it used the QR algorithm. –  Peter Oct 4 '09 at 22:16
    
I've gone into more detail in my answer –  Jacob Oct 5 '09 at 14:50

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