We describe an extension of the redistributed technique form classical proximal bundle method to the inexact situation for minimizing nonsmooth nonconvex functions. The cutting-planes model we construct is not the approximation to the whole nonconvex function, but to the local convexification of the approximate objective function, and this kind of local convexification is modified dynamically in order to always yield nonnegative linearization errors. Since we only employ the approximate function values and approximate subgradients, theoretical convergence analysis shows that an approximate stationary point or some double approximate stationary point can be obtained under some mild conditions
We consider the problem of minimizing nonsmooth convex functions, dened piecewise by a nite number o...
Bundle methods are often the algorithms of choice for nonsmooth convex optimization, especially if a...
We consider the problem of minimizing nonsmooth convex functions, defined piecewise by a finite numb...
Abstract In this paper, we propose an alternating linearization bundle method for minimizing the sum...
We present a numerical bundle-type method for local minimization of a real function of several varia...
In this paper, we present a study of the proximal point algorithm using very general regularizations...
We present a bundle type method for minimizing nonconvex nondifferentiable functions of several vari...
In this paper, we develop a version of the bundle method to solve unconstrained difference of convex...
Abstract. We propose a bundle method for minimizing nonsmooth convex functions that combines both th...
Nowadays, solving nonsmooth (not necessarily differentiable) optimization prob-lems plays a very imp...
We introduce a proximal bundle method for the numerical minimization of a nonsmooth difference-of-co...
We present an approximate nonsmooth algorithm to solve a minimization problem, in which the objectiv...
We discuss a numerical algorithm for minimization of a convex nondifferentiable function belonging t...
We discuss proximal bundle methods for minimizing f(u) subject to h(u) ≤ 0, u ∈ C, where f, h and C...
This chapter is devoted to algorithms for solving nonsmooth unconstrained difference of convex optim...
We consider the problem of minimizing nonsmooth convex functions, dened piecewise by a nite number o...
Bundle methods are often the algorithms of choice for nonsmooth convex optimization, especially if a...
We consider the problem of minimizing nonsmooth convex functions, defined piecewise by a finite numb...
Abstract In this paper, we propose an alternating linearization bundle method for minimizing the sum...
We present a numerical bundle-type method for local minimization of a real function of several varia...
In this paper, we present a study of the proximal point algorithm using very general regularizations...
We present a bundle type method for minimizing nonconvex nondifferentiable functions of several vari...
In this paper, we develop a version of the bundle method to solve unconstrained difference of convex...
Abstract. We propose a bundle method for minimizing nonsmooth convex functions that combines both th...
Nowadays, solving nonsmooth (not necessarily differentiable) optimization prob-lems plays a very imp...
We introduce a proximal bundle method for the numerical minimization of a nonsmooth difference-of-co...
We present an approximate nonsmooth algorithm to solve a minimization problem, in which the objectiv...
We discuss a numerical algorithm for minimization of a convex nondifferentiable function belonging t...
We discuss proximal bundle methods for minimizing f(u) subject to h(u) ≤ 0, u ∈ C, where f, h and C...
This chapter is devoted to algorithms for solving nonsmooth unconstrained difference of convex optim...
We consider the problem of minimizing nonsmooth convex functions, dened piecewise by a nite number o...
Bundle methods are often the algorithms of choice for nonsmooth convex optimization, especially if a...
We consider the problem of minimizing nonsmooth convex functions, defined piecewise by a finite numb...