We investigate the problem of distributed online convex optimization with complicated constraints, in which the projection operation could be the computational bottleneck. To avoid projections, distributed online projection-free methods have been proposed and attain an O(T^{3/4}) regret bound for general convex losses. However, they cannot utilize the smoothness condition, which has been exploited in the centralized setting to improve the regret. In this paper, we propose a new distributed online projection-free method with a tighter regret bound of O(T^{2/3}) for smooth and convex losses. Specifically, we first provide a distributed extension of Follow-the-Perturbed-Leader so that the smoothness can be utilized in the distributed setting. ...
International audienceWe consider the problem of online learning with non-convex losses. In terms of...
This paper describes a general framework for converting online game playing algorithms into constrai...
Abstract—This paper considers the problems of distributed online prediction and optimization. Each n...
To efficiently solve high-dimensional problems with complicated constraints, projection-free online ...
To efficiently solve online problems with complicated constraints, projection-free algorithms includ...
Distributed convex optimization refers to the task of minimizing the aggregate sum of convex risk fu...
We present new efficient \textit{projection-free} algorithms for online convex optimization (OCO), w...
This paper focuses on projection-free methods for solving smooth Online Convex Optimization (OCO) pr...
A lot of effort has been invested into characterizing the convergence rates of gradient based algori...
We aim to design universal algorithms for online convex optimization, which can handle multiple comm...
In online bandit learning, the learner aims to minimize a sequence of losses, while only observing t...
In online bandit learning, the learner aims to minimize a sequence of losses, while only observing t...
We present a unified, black-box-style method for developing and analyzing online convex optimization...
We consider Online Convex Optimization (OCO) in the setting where the costs are mm-strongly convex a...
This thesis contributes to the body of research in the design and analysis of distributed algorithms...
International audienceWe consider the problem of online learning with non-convex losses. In terms of...
This paper describes a general framework for converting online game playing algorithms into constrai...
Abstract—This paper considers the problems of distributed online prediction and optimization. Each n...
To efficiently solve high-dimensional problems with complicated constraints, projection-free online ...
To efficiently solve online problems with complicated constraints, projection-free algorithms includ...
Distributed convex optimization refers to the task of minimizing the aggregate sum of convex risk fu...
We present new efficient \textit{projection-free} algorithms for online convex optimization (OCO), w...
This paper focuses on projection-free methods for solving smooth Online Convex Optimization (OCO) pr...
A lot of effort has been invested into characterizing the convergence rates of gradient based algori...
We aim to design universal algorithms for online convex optimization, which can handle multiple comm...
In online bandit learning, the learner aims to minimize a sequence of losses, while only observing t...
In online bandit learning, the learner aims to minimize a sequence of losses, while only observing t...
We present a unified, black-box-style method for developing and analyzing online convex optimization...
We consider Online Convex Optimization (OCO) in the setting where the costs are mm-strongly convex a...
This thesis contributes to the body of research in the design and analysis of distributed algorithms...
International audienceWe consider the problem of online learning with non-convex losses. In terms of...
This paper describes a general framework for converting online game playing algorithms into constrai...
Abstract—This paper considers the problems of distributed online prediction and optimization. Each n...