On the Convergence Rate of <i>l</i><sub>p</sub>-Norm Multiple Kernel Learning

Marius Kloft; Gilles Blanchard

We derive an upper bound on the local Rademacher complexity of l_p-norm multiple kernel learning, which yields a tighter excess risk bound than global approaches. Previous local approaches analyzed the case p=1 only while our analysis covers all cases 1≤p≤∞, assuming the different feature mappings corresponding to the different kernels to be uncorrelated. We also show a lower bound that shows that the bound is tight, and derive consequences regarding excess loss, namely fast convergence rates of the order O(n^-α/1+α), where α is the minimum eigenvalue decay rate of the individual kernels.

On the Convergence Rate of l_p-Norm Multiple Kernel Learning

Abstract

On the Convergence Rate of lp-Norm Multiple Kernel Learning

Abstract

On the Convergence Rate of l_p-Norm Multiple Kernel Learning