34 pages, 15 figuresSpurred by the enthusiasm surrounding the "Big Data" paradigm, the mathematical and algorithmic tools of online optimization have found widespread use in problems where the trade-off between data exploration and exploitation plays a predominant role. This trade-off is of particular importance to several branches and applications of signal processing, such as data mining, statistical inference, multimedia indexing and wireless communications (to name but a few). With this in mind, the aim of this tutorial paper is to provide a gentle introduction to online optimization and learning algorithms that are asymptotically optimal in hindsight - i.e., they approach the performance of a virtual algorithm with unlimited computatio...
We study Online Convex Optimization in the unbounded setting where neither predictions nor gradient ...
We present new efficient \textit{projection-free} algorithms for online convex optimization (OCO), w...
Online learning and convex optimization algorithms have become essential tools for solving problems ...
International audienceThe high degree of variability present in current and emerging mobile wireless...
In this research we study some online learning algorithms in the online convex optimization framewor...
Tracking time-varying sparse signals is a recent problem with widespread applications. Techniques de...
Abstract We consider the problem of online optimization, where a learner chooses a decision from a g...
The framework of online learning with memory naturally captures learning problems with temporal effe...
Some of the most compelling applications of online convex optimization, includ-ing online prediction...
Stochastic and adversarial data are two widely studied settings in online learning. But many optimiz...
Much of the work in online learning focuses on the study of sublinear upper bounds on the regret. In...
We consider the decision-making framework of online convex optimization with a very large number of ...
We present a unified, black-box-style method for developing and analyzing online convex optimization...
The regret bound of dynamic online learning algorithms is often expressed in terms of the variation ...
We consider online convex optimizations in the bandit setting. The decision maker does not know the ...
We study Online Convex Optimization in the unbounded setting where neither predictions nor gradient ...
We present new efficient \textit{projection-free} algorithms for online convex optimization (OCO), w...
Online learning and convex optimization algorithms have become essential tools for solving problems ...
International audienceThe high degree of variability present in current and emerging mobile wireless...
In this research we study some online learning algorithms in the online convex optimization framewor...
Tracking time-varying sparse signals is a recent problem with widespread applications. Techniques de...
Abstract We consider the problem of online optimization, where a learner chooses a decision from a g...
The framework of online learning with memory naturally captures learning problems with temporal effe...
Some of the most compelling applications of online convex optimization, includ-ing online prediction...
Stochastic and adversarial data are two widely studied settings in online learning. But many optimiz...
Much of the work in online learning focuses on the study of sublinear upper bounds on the regret. In...
We consider the decision-making framework of online convex optimization with a very large number of ...
We present a unified, black-box-style method for developing and analyzing online convex optimization...
The regret bound of dynamic online learning algorithms is often expressed in terms of the variation ...
We consider online convex optimizations in the bandit setting. The decision maker does not know the ...
We study Online Convex Optimization in the unbounded setting where neither predictions nor gradient ...
We present new efficient \textit{projection-free} algorithms for online convex optimization (OCO), w...
Online learning and convex optimization algorithms have become essential tools for solving problems ...