We consider the problem of maximizing a non-concave Lipschitz multivariate function f over a compact domain. We provide regret guarantees (i.e., optimization error bounds) for a very natural algorithm originally designed by Piyavskii and Shubert in 1972. Our results hold in a general setting in which values of f can only be accessed approximately. In particular, they yield state-of-the-art regret bounds both when f is observed exactly and when evaluations are perturbed by an independent subgaussian noise
Many problems in economy may be formulated as global optimization problems. Most numerically promisi...
This work addresses the sequential optimization of an unknown and potentially nonconvex function ove...
International audienceWe consider stochastic multi-armed bandit problems where the expected reward i...
We consider the problem of maximizing a non-concave Lipschitz multivariate function over a compact d...
We consider the problem of maximizing a non-concave Lipschitz multivariate function over a compact d...
AbstractWe consider the global optimization problem for d-variate Lipschitz functions which, in a ce...
We consider a family of function classes which allow functions with several minima and which deman...
International audienceWe consider the setting of stochastic bandit problems with a continuum of arms...
Global optimization methods based on Lipschitz bounds have been analyzed and applied widely to solve...
Plusieurs problèmes importants issus de l'apprentissage statistique et de la science des données imp...
The global optimisation problem has received much attention in the past twenty-five years. The probl...
Methods of Lipschitz optimization allow one to find and confirm the global minimum of multivariate L...
International audienceMotivated by applications to machine learning and imaging science, we study a ...
A depth-first analog to the Lipschitz based Piyavskii-Shubert global maximization algorithm is prese...
An Adaptive Cubic Overestimation (ACO) algorithm for unconstrained optimization, generalizing a meth...
Many problems in economy may be formulated as global optimization problems. Most numerically promisi...
This work addresses the sequential optimization of an unknown and potentially nonconvex function ove...
International audienceWe consider stochastic multi-armed bandit problems where the expected reward i...
We consider the problem of maximizing a non-concave Lipschitz multivariate function over a compact d...
We consider the problem of maximizing a non-concave Lipschitz multivariate function over a compact d...
AbstractWe consider the global optimization problem for d-variate Lipschitz functions which, in a ce...
We consider a family of function classes which allow functions with several minima and which deman...
International audienceWe consider the setting of stochastic bandit problems with a continuum of arms...
Global optimization methods based on Lipschitz bounds have been analyzed and applied widely to solve...
Plusieurs problèmes importants issus de l'apprentissage statistique et de la science des données imp...
The global optimisation problem has received much attention in the past twenty-five years. The probl...
Methods of Lipschitz optimization allow one to find and confirm the global minimum of multivariate L...
International audienceMotivated by applications to machine learning and imaging science, we study a ...
A depth-first analog to the Lipschitz based Piyavskii-Shubert global maximization algorithm is prese...
An Adaptive Cubic Overestimation (ACO) algorithm for unconstrained optimization, generalizing a meth...
Many problems in economy may be formulated as global optimization problems. Most numerically promisi...
This work addresses the sequential optimization of an unknown and potentially nonconvex function ove...
International audienceWe consider stochastic multi-armed bandit problems where the expected reward i...