Add to ORKGAbstract. This paper studies convergence properties of regularized Newton methods for minimizing a convex function whose Hessian matrix may be singular everywhere. We show that if the objective function is LC2, then the methods possess local quadratic convergence under a local error bound condition without the requirement of isolated nonsingular solutions. By using a backtracking line search, we globalize an inexact regularized Newton method. We show that the unit stepsize is accepted eventually. Limited numerical experiments are presented, which show the practical advantage of the method
In this paper we suggest a cubic regularization for a Newton method as applied to unconstrained mini...
International audienceWe present a regularization algorithm to solve a smooth unconstrained minimiza...
More than a decade agao, Newton's method has been proposed for constructing the convex best int...
This paper studies convergence properties of regularized Newton methods for minimizing a convex func...
In this paper, we study accelerated Regularized Newton Methods for minimizing objectives formed as a...
In this paper, we study the regularized second-order methods for unconstrained minimization of a twi...
In this paper, we study the iteration complexity of cubic regularization of Newton method for solvin...
In this paper we propose an accelerated version of the cubic regularization of Newton's method [6]. ...
In this paper we derive efficiency estimates of the regularized Newton's method as applied to constr...
The regularized Newton method (RNM) is one of the efficient solution methods for the unconstrained c...
In this paper, we study accelerated regularized Newton methods for minimizing objectives formed as a...
In this paper, we provide theoretical analysis for a cubic regularization of Newton method as applie...
In this paper, we consider the problem of finding a convex function which interpolates given points ...
We consider variants of trust-region and adaptive cubic regularization methods for non-convex optimi...
Sparse optimization has seen an evolutionary advance in the past decade with extensive applications ...
In this paper we suggest a cubic regularization for a Newton method as applied to unconstrained mini...
International audienceWe present a regularization algorithm to solve a smooth unconstrained minimiza...
More than a decade agao, Newton's method has been proposed for constructing the convex best int...
This paper studies convergence properties of regularized Newton methods for minimizing a convex func...
In this paper, we study accelerated Regularized Newton Methods for minimizing objectives formed as a...
In this paper, we study the regularized second-order methods for unconstrained minimization of a twi...
In this paper, we study the iteration complexity of cubic regularization of Newton method for solvin...
In this paper we propose an accelerated version of the cubic regularization of Newton's method [6]. ...
In this paper we derive efficiency estimates of the regularized Newton's method as applied to constr...
The regularized Newton method (RNM) is one of the efficient solution methods for the unconstrained c...
In this paper, we study accelerated regularized Newton methods for minimizing objectives formed as a...
In this paper, we provide theoretical analysis for a cubic regularization of Newton method as applie...
In this paper, we consider the problem of finding a convex function which interpolates given points ...
We consider variants of trust-region and adaptive cubic regularization methods for non-convex optimi...
Sparse optimization has seen an evolutionary advance in the past decade with extensive applications ...
In this paper we suggest a cubic regularization for a Newton method as applied to unconstrained mini...
International audienceWe present a regularization algorithm to solve a smooth unconstrained minimiza...
More than a decade agao, Newton's method has been proposed for constructing the convex best int...