We consider prediction with expert advice when the loss vectors are assumed to lie in a set described by the sum of atomic norm balls. We derive a regret bound for a general version of the online mirror descent (OMD) algorithm that uses a combination of regularizers, each adapted to the constituent atomic norms. The general result recovers standard OMD regret bounds, and yields regret bounds for new structured settings where the loss vectors are (i) noisy versions of vectors from a low-dimensional subspace, (ii) sparse vectors corrupted with noise, and (iii) sparse perturbations of low-rank vectors. For the problem of online learning with structured losses, we also show lower bounds on regret in terms of rank and sparsity of the lo...
We address online linear optimization problems when the possible actions of the decision maker are r...
Much of the work in online learning focuses on the study of sublinear upper bounds on the regret. In...
First, we study online learning with an extended notion of regret, which is defined with respect to ...
Online learning algorithms are fast, memory-efficient, easy to implement, and applicable to many pre...
Abstract We study online aggregation of the predictions of experts, and first show new second-order ...
We study online aggregation of the predictions of experts, and first show new second-order regret bo...
We introduce online learning algorithms which are independent of feature scales, proving regret boun...
The framework of online learning with memory naturally captures learning problems with temporal effe...
We consider the problem of online linear regression on arbitrary deterministic sequences when the am...
International audienceWe consider the setting of online linear regression for arbitrary deterministi...
We consider an online learning framework where the task is to predict a permutation which represents...
© 2017 Neural information processing systems foundation. All rights reserved. We study a variant of ...
Consider the following game: There is a fixed set V of n items. At each step an adversary chooses a ...
We present methods for online linear optimization that take advantage of benign (as opposed to worst...
We investigate contextual online learning with nonparametric (Lipschitz) comparison classes under di...
We address online linear optimization problems when the possible actions of the decision maker are r...
Much of the work in online learning focuses on the study of sublinear upper bounds on the regret. In...
First, we study online learning with an extended notion of regret, which is defined with respect to ...
Online learning algorithms are fast, memory-efficient, easy to implement, and applicable to many pre...
Abstract We study online aggregation of the predictions of experts, and first show new second-order ...
We study online aggregation of the predictions of experts, and first show new second-order regret bo...
We introduce online learning algorithms which are independent of feature scales, proving regret boun...
The framework of online learning with memory naturally captures learning problems with temporal effe...
We consider the problem of online linear regression on arbitrary deterministic sequences when the am...
International audienceWe consider the setting of online linear regression for arbitrary deterministi...
We consider an online learning framework where the task is to predict a permutation which represents...
© 2017 Neural information processing systems foundation. All rights reserved. We study a variant of ...
Consider the following game: There is a fixed set V of n items. At each step an adversary chooses a ...
We present methods for online linear optimization that take advantage of benign (as opposed to worst...
We investigate contextual online learning with nonparametric (Lipschitz) comparison classes under di...
We address online linear optimization problems when the possible actions of the decision maker are r...
Much of the work in online learning focuses on the study of sublinear upper bounds on the regret. In...
First, we study online learning with an extended notion of regret, which is defined with respect to ...