Algorithmic Stability and Generalization Performance

Part of Advances in Neural Information Processing Systems 13 (NIPS 2000)

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Authors

Olivier Bousquet, André Elisseeff

Abstract

We present a novel way of obtaining PAC-style bounds on the gen(cid:173) eralization error of learning algorithms, explicitly using their stabil(cid:173) ity properties. A stable learner is one for which the learned solution does not change much with small changes in the training set. The bounds we obtain do not depend on any measure of the complexity of the hypothesis space (e.g. VC dimension) but rather depend on how the learning algorithm searches this space, and can thus be applied even when the VC dimension is infinite. We demonstrate that regularization networks possess the required stability property and apply our method to obtain new bounds on their generalization performance.