We consider the problem of optimizing a black-box function based on noisy bandit feedback. Kernelized bandit algorithms have shown strong empirical and theoretical performance for this problem. They heavily rely on the assumption that the model is well-specified, however, and can fail without it. Instead, we introduce and address a \emph{misspecified} kernelized bandit setting where the unknown function can be ϵ --uniformly approximated by a function with a bounded norm in some Reproducing Kernel Hilbert Space (RKHS). We design efficient and practical algorithms whose performance degrades minimally in the presence of model misspecification. Specifically, we present two algorithms based on Gaussian process (GP) methods: an optimistic EC-G...
We consider the problem of online learning in misspecified linear stochastic multi-armed bandit prob...
How can we take advantage of opportunities for experimental parallelization in exploration-exploitat...
Gaussian processes are ubiquitous in machine learning, statistics, and applied mathematics. They pro...
We consider the problem of optimizing an unknown (typically non-convex) function with a bounded norm...
Many applications require optimizing an unknown, noisy function that is expensive to evaluate. We fo...
Many applications require optimizing an un-known, noisy function that is expensive to evaluate. We f...
Many applications require optimizing an unknown, noisy function that is expensive to evaluate. We fo...
International audienceGaussian processes (GP) are a stochastic processes, used as Bayesian approach ...
Kernel-based bandit is an extensively studied black-box optimization problem, in which the objective...
Bandit algorithms are concerned with trading exploration with exploitation where a number of options...
International audienceBandit algorithms are concerned with trading exploration with exploitation whe...
This thesis presents some statistical refinements of the bandits approach presented in [11] in the s...
We consider the problem of optimising functions in the reproducing kernel Hilbert space (RKHS) of a ...
This paper analyzes the problem of Gaussian process (GP) bandits with deterministic observations. Th...
Many applications in machine learning require optimizing unknown functions defined over a high-dimen...
We consider the problem of online learning in misspecified linear stochastic multi-armed bandit prob...
How can we take advantage of opportunities for experimental parallelization in exploration-exploitat...
Gaussian processes are ubiquitous in machine learning, statistics, and applied mathematics. They pro...
We consider the problem of optimizing an unknown (typically non-convex) function with a bounded norm...
Many applications require optimizing an unknown, noisy function that is expensive to evaluate. We fo...
Many applications require optimizing an un-known, noisy function that is expensive to evaluate. We f...
Many applications require optimizing an unknown, noisy function that is expensive to evaluate. We fo...
International audienceGaussian processes (GP) are a stochastic processes, used as Bayesian approach ...
Kernel-based bandit is an extensively studied black-box optimization problem, in which the objective...
Bandit algorithms are concerned with trading exploration with exploitation where a number of options...
International audienceBandit algorithms are concerned with trading exploration with exploitation whe...
This thesis presents some statistical refinements of the bandits approach presented in [11] in the s...
We consider the problem of optimising functions in the reproducing kernel Hilbert space (RKHS) of a ...
This paper analyzes the problem of Gaussian process (GP) bandits with deterministic observations. Th...
Many applications in machine learning require optimizing unknown functions defined over a high-dimen...
We consider the problem of online learning in misspecified linear stochastic multi-armed bandit prob...
How can we take advantage of opportunities for experimental parallelization in exploration-exploitat...
Gaussian processes are ubiquitous in machine learning, statistics, and applied mathematics. They pro...