# VC Dimension of union?

Suppose I have two concept classes: C1 and C2. Suppose that the VC Dimension of C1 is d and the VC Dimension of C2 is d.

What is the biggest value of the VC dimension of the union of C1 and C2?

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It depends on the classification model. Are we talking perceptrons here or SVMs (in which case, it depends on the kernel)? This also smells like homework. –  David Titarenco Jan 8 '11 at 21:45

See Eisenstat and Angluin's paper, "The VC Dimension of k-fold union", where they show that the VC dimension increases asymptotically as Theta(klogk).

The StompChicken answer can not be correct, because it implies the VC dimension of k-fold union is O(k). I believe he argues correctly for a lower bound of d_1+d_2.

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Thanks for the correction –  StompChicken Jul 27 '11 at 14:11
To disagree with HRJ I don't think it's even a correct lower bound of the union. For example, let `X = {x1,x2,x3,x4}` and `C = {{x1,x3},{x2,x4}}` then C can shatter any subset of size 1 but not, for example `{x1,x2}` so `C` has VC dimension 1. But, the 2-fold union of C is `C^2={{x1,x3},{x2,x4},{x1,x2,x3,x4}}` which is still of VC dimension 1. Further unions are just going to end up with the same thing. So, I think the lower bound of the k-fold union is `d`. Then again, I could be wrong.