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 Sep 6, 2006, 2:18:46 PM (15 years ago)
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trunk/doc/Statistics.tex
r627 r639 276 276 The polynomial kernel of degree $N$ is defined as $(1+<x,y>)^N$, where 277 277 $<x,y>$ is the linear kernel (usual scalar product). For the weighted 278 case we define the linear kernel to be $<x,y>=\sum w_xw_yxy}$ and the278 case we define the linear kernel to be $<x,y>=\sum {w_xw_yxy}$ and the 279 279 polynomial kernel can be calculated as before 280 280 $(1+<x,y>)^N$. Is this kernel a proper kernel (always being semi
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