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Given the same A, b and L2 regularization parameter beta = 0, why do ridge and \ give two different solutions?

b = [ 0
    -2
    -3
    -3
    -3
    -3
    -3
    -3
    -3
    -3
    -3
    -3
    -3 ];

A = [
1   0   0   0
0.750000000000000   0.250000000000000   0   0
0.500000000000000   0.500000000000000   0   0
0.250000000000000   0.750000000000000   0   0
0   1   0   0
0   0.750000000000000   0.250000000000000   0
0   0.500000000000000   0.500000000000000   0
0   0.250000000000000   0.750000000000000   0
0   0   1   0
0   0   0.750000000000000   0.250000000000000
0   0   0.500000000000000   0.500000000000000
0   0   0.250000000000000   0.750000000000000
0   0   0   1
];

>> ridge(b, A, 0,0)
ans = 
    0.6942
   -0.1856
         0
   -0.0468

>> A \ b
ans = 
   -0.8604
   -3.4188
   -2.8970
   -3.0343
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Please try to format your posts properly. Also try to use simpler examples. –  Nzbuu Jan 13 '12 at 19:48
1  
Have you looked at the output of ridge(b,A,0,1)? Or read the ridge function help? –  Nzbuu Jan 13 '12 at 19:54

1 Answer 1

That's because, as you can se in the documentation, ridge uses a slightly different algorithm than mldivide: since the "classical" pseudoinverse ((A' *A)^-1 *A) could become sensible to small errors for (A' *A)^-1 close to singular values, the formula is modified to (A' *A - kI)^-1 *A, reducing the conditioning of the problem.

share|improve this answer
    
Sorry, but this response is wrong for several reasons. First of all, ridge does NOT use the expression you show. It uses a numerically stable version that uses \ instead. The point is, if you are going to talk about conditioning problems, then using a numerically poor formula is silly in the extreme! As well, the "classical" pseudo-inverse is best never written using a matrix inverse. Instead, use x=A\y. –  user85109 Jan 13 '12 at 22:15
    
I know about the conditioning issue. What I wanna ask is that why they produce different solutions even if I choose k=0 in (A' *A - kI)^-1. In this case, I think / 's solution is more desirable. –  user864128 Apr 1 '12 at 20:05

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