An Adaptive Cubic Overestimation (ACO) algorithm for unconstrained optimization, generalizing a method due to Nesterov and Polyak (Math. Programming 108, 2006, pp 177-205), is proposed. At each iteration of Nesterov and Polyak's approach, the global minimizer of a local cubic overestimator of the objective function is determined, and this ensures a significant improvement in the objective so long as the Hessian of the objective is Lipschitz continuous and its Lipschitz constant is available. The twin requirements of global model optimality and the availability of Lipschitz constants somewhat limit the applicability of such an approach, particularly for large-scale problems. However the promised powerful worst-case theoretical guarantees pro...
Plusieurs problèmes importants issus de l'apprentissage statistique et de la science des données imp...
We consider the problem of maximizing a non-concave Lipschitz multivariate function over a compact d...
The adaptive cubic regularization method (Cartis et al. in Math. Program. Ser. A 127(2):245–295, 201...
An Adaptive Cubic Overestimation (ACO) algorithm for unconstrained optimization, generalizing a meth...
An Adaptive Cubic Overestimation (ACO) algorithm for unconstrained optimization is proposed, general...
An Adaptive Regularisation algorithm using Cubics (ARC) is proposed for unconstrained optimization, ...
In recent years, cubic regularization algorithms for unconstrained optimization have been defined as...
An Adaptive Regularisation framework using Cubics (ARC) was proposed for unconstrained optimization ...
The adaptive cubic regularization algorithms described in Cartis, Gould and Toint [Adaptive cubic re...
An Adaptive Regularisation algorithm using Cubics (ARC) is proposed for unconstrained opti-mization,...
AbstractA nongradient algorithm for nonlinear nonconvex Lipschitzian optimization problems is propos...
AbstractA new algorithm for full global optimization of a Lipschitzian function over an arbitrary bo...
AbstractA code and some numerical experiments with a one-dimensional cubic algorithm are presented. ...
The adaptive cubic regularization method solves an unconstrained optimization model by using a three...
Adaptive cubic regularization methods have emerged as a credible alternative to linesearch and trust...
Plusieurs problèmes importants issus de l'apprentissage statistique et de la science des données imp...
We consider the problem of maximizing a non-concave Lipschitz multivariate function over a compact d...
The adaptive cubic regularization method (Cartis et al. in Math. Program. Ser. A 127(2):245–295, 201...
An Adaptive Cubic Overestimation (ACO) algorithm for unconstrained optimization, generalizing a meth...
An Adaptive Cubic Overestimation (ACO) algorithm for unconstrained optimization is proposed, general...
An Adaptive Regularisation algorithm using Cubics (ARC) is proposed for unconstrained optimization, ...
In recent years, cubic regularization algorithms for unconstrained optimization have been defined as...
An Adaptive Regularisation framework using Cubics (ARC) was proposed for unconstrained optimization ...
The adaptive cubic regularization algorithms described in Cartis, Gould and Toint [Adaptive cubic re...
An Adaptive Regularisation algorithm using Cubics (ARC) is proposed for unconstrained opti-mization,...
AbstractA nongradient algorithm for nonlinear nonconvex Lipschitzian optimization problems is propos...
AbstractA new algorithm for full global optimization of a Lipschitzian function over an arbitrary bo...
AbstractA code and some numerical experiments with a one-dimensional cubic algorithm are presented. ...
The adaptive cubic regularization method solves an unconstrained optimization model by using a three...
Adaptive cubic regularization methods have emerged as a credible alternative to linesearch and trust...
Plusieurs problèmes importants issus de l'apprentissage statistique et de la science des données imp...
We consider the problem of maximizing a non-concave Lipschitz multivariate function over a compact d...
The adaptive cubic regularization method (Cartis et al. in Math. Program. Ser. A 127(2):245–295, 201...