We consider the problem of multi-fidelity zeroth-order optimization, where one can evaluate a function $f$ at various approximation levels (of varying costs), and the goal is to optimize $f$ with the cheapest evaluations possible. In this paper, we study \emph{certified} algorithms, which are additionally required to output a data-driven upper bound on the optimization error. We first formalize the problem in terms of a min-max game between an algorithm and an evaluation environment. We then propose a certified variant of the MFDOO algorithm and derive a bound on its cost complexity for any Lipschitz function $f$. We also prove an $f$-dependent lower bound showing that this algorithm has a near-optimal cost complexity. We close the paper by...
AbstractWe consider the global optimization problem for d-variate Lipschitz functions which, in a ce...
In this work, we present a novel framework to perform multi-objective optimization when considering ...
International audienceOptimizing expensive models is a challenging task in the aeronautical design c...
International audienceIn multi-fidelity optimization, we have access to biased approximations of var...
We study the problem of zeroth-order (black-box) optimization of a Lipschitz function $f$ defined on...
International audienceWe consider function optimization as a sequential decision making problem unde...
We consider the problem of maximizing a non-concave Lipschitz multivariate function over a compact d...
We consider a family of function classes which allow functions with several minima and which deman...
This work addresses the sequential optimization of an unknown and potentially nonconvex function ove...
Multifidelity optimization problems refer to a class of problems where one is presented with a physi...
We study the novel problem of blackbox optimization of multiple objectives via multi-fidelity functi...
We provide sharp worst-case evaluation complexity bounds for nonconvex minimization problems with ge...
AbstractThis paper considers the problem of approximating the minimum of a continuous function using...
International audienceThis paper exhibits lower and upper bounds on runtimes for expensive noisy opt...
How can we efficiently gather information to optimize an unknown function, when presented with multi...
AbstractWe consider the global optimization problem for d-variate Lipschitz functions which, in a ce...
In this work, we present a novel framework to perform multi-objective optimization when considering ...
International audienceOptimizing expensive models is a challenging task in the aeronautical design c...
International audienceIn multi-fidelity optimization, we have access to biased approximations of var...
We study the problem of zeroth-order (black-box) optimization of a Lipschitz function $f$ defined on...
International audienceWe consider function optimization as a sequential decision making problem unde...
We consider the problem of maximizing a non-concave Lipschitz multivariate function over a compact d...
We consider a family of function classes which allow functions with several minima and which deman...
This work addresses the sequential optimization of an unknown and potentially nonconvex function ove...
Multifidelity optimization problems refer to a class of problems where one is presented with a physi...
We study the novel problem of blackbox optimization of multiple objectives via multi-fidelity functi...
We provide sharp worst-case evaluation complexity bounds for nonconvex minimization problems with ge...
AbstractThis paper considers the problem of approximating the minimum of a continuous function using...
International audienceThis paper exhibits lower and upper bounds on runtimes for expensive noisy opt...
How can we efficiently gather information to optimize an unknown function, when presented with multi...
AbstractWe consider the global optimization problem for d-variate Lipschitz functions which, in a ce...
In this work, we present a novel framework to perform multi-objective optimization when considering ...
International audienceOptimizing expensive models is a challenging task in the aeronautical design c...