Unregularized Online Learning Algorithms with General Loss Functions
This work provides theoretical guarantees for online learning algorithms, which is incremental but important for researchers in machine learning optimization.
The paper tackles the problem of analyzing unregularized online learning algorithms in RKHS for classification with general loss functions, deriving explicit convergence rates and establishing conditions for convergence of the last iterate, with results extending prior work on specific losses.
In this paper, we consider unregularized online learning algorithms in a Reproducing Kernel Hilbert Spaces (RKHS). Firstly, we derive explicit convergence rates of the unregularized online learning algorithms for classification associated with a general gamma-activating loss (see Definition 1 in the paper). Our results extend and refine the results in Ying and Pontil (2008) for the least-square loss and the recent result in Bach and Moulines (2011) for the loss function with a Lipschitz-continuous gradient. Moreover, we establish a very general condition on the step sizes which guarantees the convergence of the last iterate of such algorithms. Secondly, we establish, for the first time, the convergence of the unregularized pairwise learning algorithm with a general loss function and derive explicit rates under the assumption of polynomially decaying step sizes. Concrete examples are used to illustrate our main results. The main techniques are tools from convex analysis, refined inequalities of Gaussian averages, and an induction approach.