International audienceThe performance measure of an algorithm is a crucial part of its analysis. The performance can be determined by the study on the convergence rate of the algorithm in question. It is necessary to study some (hopefully convergent) sequence that will measure how " good " is the approximated optimum compared to the real optimum. The concept of Regret is widely used in the bandit literature for assessing the performance of an algorithm. The same concept is also used in the framework of optimization algorithms, sometimes under other names or without a specific name. And the numerical evaluation of convergence rate of noisy algorithms often involves approximations of regrets. We discuss here two types of approximations of Sim...
Abstract: Narendra-Shapiro (NS) algorithms are bandit-type algorithms that have been introduced in t...
In this paper, we focus on a theory-practice gap for Adam and its variants (AMSgrad, AdamNC, etc.). ...
We address online linear optimization problems when the possible actions of the decision maker are r...
International audienceThe performance measure of an algorithm is a crucial part of its analysis. The...
International audienceThe black box complexity of noisy-optimization is a great research area, with ...
International audienceIn an optimization framework, some criteria might be more relevant than others...
This thesis exposes contributions to the analysis of algorithms for noisy functions. It exposes conv...
This paper treats the task of designing optimization algorithms as an optimal control problem. Using...
International audienceDerivative Free Optimization is known to be an efficient and robust method to ...
Abstract. For the prediction with expert advice setting, we consider methods to construct algorithms...
Abstract. Noisy optimization is the optimization of objective functions corrupted by noise. A portfo...
International audienceNoisy optimization is the optimization of objective functions corrupted by noi...
First, we study online learning with an extended notion of regret, which is defined with respect to ...
Many applications require optimizing an unknown, noisy function that is expensive to evaluate. We fo...
(a) The mean of the average regret (RT/T) across 1000 trials for each algorithm in the 3D case. Baye...
Abstract: Narendra-Shapiro (NS) algorithms are bandit-type algorithms that have been introduced in t...
In this paper, we focus on a theory-practice gap for Adam and its variants (AMSgrad, AdamNC, etc.). ...
We address online linear optimization problems when the possible actions of the decision maker are r...
International audienceThe performance measure of an algorithm is a crucial part of its analysis. The...
International audienceThe black box complexity of noisy-optimization is a great research area, with ...
International audienceIn an optimization framework, some criteria might be more relevant than others...
This thesis exposes contributions to the analysis of algorithms for noisy functions. It exposes conv...
This paper treats the task of designing optimization algorithms as an optimal control problem. Using...
International audienceDerivative Free Optimization is known to be an efficient and robust method to ...
Abstract. For the prediction with expert advice setting, we consider methods to construct algorithms...
Abstract. Noisy optimization is the optimization of objective functions corrupted by noise. A portfo...
International audienceNoisy optimization is the optimization of objective functions corrupted by noi...
First, we study online learning with an extended notion of regret, which is defined with respect to ...
Many applications require optimizing an unknown, noisy function that is expensive to evaluate. We fo...
(a) The mean of the average regret (RT/T) across 1000 trials for each algorithm in the 3D case. Baye...
Abstract: Narendra-Shapiro (NS) algorithms are bandit-type algorithms that have been introduced in t...
In this paper, we focus on a theory-practice gap for Adam and its variants (AMSgrad, AdamNC, etc.). ...
We address online linear optimization problems when the possible actions of the decision maker are r...