Add to ORKGAbstract. The subgradient method is used frequently to optimize dual functions in Lagrangian relaxation for separable integer programming problems. In the method, all subproblems must be solved optimally to obtain a subgradient direction. In this paper, the surrogate subgradient method is developed, where a proper direction can be obtained without solving optimally all the subproblems. In fact, only an approximate optimization of one subproblem is needed to get a proper surrogate subgradient direction, and the directions are smooth for problems of large size. The convergence of the algorithm is proved. Compared with methods that take effort to find better directions, this method can obtain good directions with much less effort and provides ...
Lagrangian relaxation has recently emerged as an important method for solving complex scheduling pro...
The topic of the thesis is subgradient optimization methods in convex, nonsmooth optimization. These...
In this thesis we propose a novel way to use subgradients and the Lagrangean multipliers to construc...
Abstract When applied to large-scale separable optimization problems, the recently developed surroga...
AbstractThis paper examines algorithmic strategies relating to the formulation of Lagrangian duals, ...
Subgradient method and bundle methods are frequently used in Lagrangian relaxation for integer optim...
Subgradient methods (SM) have long been the preferred way to solve the large-scale Nondifferentiable...
In this article, we continue to study the modified subgradient (MSG) algorithm previously suggested ...
In mathematical optimzation, the Lagrangian approach is a general method to find an optimal solution...
Recently a new technique for solving pure integer programming problems has been suggested It consist...
In the modern digital economy, optimal decision support systems, as well as machine learning systems...
We study convergence properties of a modified subgradient algorithm, applied to the dual problem def...
Subgradient methods (SM) have long been the preferred way to solve the large-scale Nondifferentiable...
Piecewise affine functions arise from Lagrangian duals of integer programming problems, and optimizi...
It is well-known that the Lagrangian dual of an Integer Linear Program (ILP) provides the same bound...
Lagrangian relaxation has recently emerged as an important method for solving complex scheduling pro...
The topic of the thesis is subgradient optimization methods in convex, nonsmooth optimization. These...
In this thesis we propose a novel way to use subgradients and the Lagrangean multipliers to construc...
Abstract When applied to large-scale separable optimization problems, the recently developed surroga...
AbstractThis paper examines algorithmic strategies relating to the formulation of Lagrangian duals, ...
Subgradient method and bundle methods are frequently used in Lagrangian relaxation for integer optim...
Subgradient methods (SM) have long been the preferred way to solve the large-scale Nondifferentiable...
In this article, we continue to study the modified subgradient (MSG) algorithm previously suggested ...
In mathematical optimzation, the Lagrangian approach is a general method to find an optimal solution...
Recently a new technique for solving pure integer programming problems has been suggested It consist...
In the modern digital economy, optimal decision support systems, as well as machine learning systems...
We study convergence properties of a modified subgradient algorithm, applied to the dual problem def...
Subgradient methods (SM) have long been the preferred way to solve the large-scale Nondifferentiable...
Piecewise affine functions arise from Lagrangian duals of integer programming problems, and optimizi...
It is well-known that the Lagrangian dual of an Integer Linear Program (ILP) provides the same bound...
Lagrangian relaxation has recently emerged as an important method for solving complex scheduling pro...
The topic of the thesis is subgradient optimization methods in convex, nonsmooth optimization. These...
In this thesis we propose a novel way to use subgradients and the Lagrangean multipliers to construc...