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Why in the theory of support vector machines, the points from the training set which lie on the margin of the maximum-margin hyperplane are called the support vectors? They are points, aren't they?

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up vote 3 down vote accepted

In this situation, points and vectors are really the same thing.

Given some fixed origin, each point in space can be described by a vector, and conversely, every vector defines a point in space.

EDIT (based on comment):

The hyperplane is chosen so that it best separates the two classes. It only depends on the vectors nearest the hyperplane - these are called the "support" vectors. The picture on the wikipedia page clasifies this.

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I think I now get it, the separating hyperplane is defined by a vector which is really a linear combination of the points from the training set, which in turn can be treated as vectors. That's why they call them support vectors. –  ZviBar Oct 31 '12 at 12:35
    
Exactly. Thanks! –  ZviBar Oct 31 '12 at 13:01
    
Actually the support vectors (points) are those x_i's from the dataset, that have the corresponding alpha_i's set to non-zero values in the Lagrange multipliers problem statement. See the wikipedia article posted by @daoudc. –  Nejc Nov 2 '12 at 8:28
    
I think what really answers my question is what @daoudc said in his first response, that is that a point can be defined by a vector at a fixed origin. –  ZviBar Dec 2 '12 at 21:38
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