What is VC dimension (Vapnik-Chervonenkis dimension) of an oriented hyperplane? I know that VC dimension of set of oriented hyperplanes is $n+1$. Is it the same? I came across this question recently... I know VC dimensions of several algorithms but not sure how to apply this to hyperplanes. Thanks!
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What would be an example of a nonoriented hyperplane? – alancalvitti Jan 09 '13 at 03:26