Computer Science Pattern Recoginition (Linear Discriminant Functions)
Cancelled
Posted
7 years ago
Paid on delivery
$10-15 USD
Paid on delivery
Cancelled
Paid on delivery
Just 1 problem. The following problem states...
Let B be a n x n positive semi-definite matrix. Show that K(x,z) = x' B z defines a kernel K(x,z) = <\phi(x),\phi(z)> = \sum_{i=1}^n \phi_i (x)\phi_i(z), where \phi defines the feature space.
The proof pages will be provided to you for support.
Project ID: #13582167
About the project
Remote project
Active 7 years ago