In the paper, the aggregate constraint-shifting homotopy method for solving general nonconvex nonlinear programming is considered. The aggregation is only about inequality constraint functions. Without any cone condition for the constraint functions, the existence and convergence of the globally convergent solution to the K-K-T system are obtained for both feasible and infeasible starting points under much weaker conditions
In this paper, we propose a homotopy continuous method (HCM) for solving a weak efficient solution o...
Abstract: We propose a new method for solving nonconvex semi-infinite problems by using a concave ov...
AbstractAs a powerful mechanism, fixed point theorems have many applications in mathematical and eco...
AbstractIn this paper, a constraint shifting combined homotopy method for solving multi-objective pr...
For many years, globally convergent probability-one homotopy methods have been remarkably succes...
AbstractIn this paper, a new algorithm for tracing the combined homotopy path of the non-convex nonl...
Probability-one homotopy methods are a class of algorithms for solving nonlinear systems of equation...
Homotopy methods are powerful tools for solving nonlinear programming. Their global convergence can ...
A trust-region algorithm for solving the equality constrained optimization problem is presented. Thi...
The basic theory for probability one globally convergent homotopy algorithms was developed in 1976, ...
In this paper we introduce a new approach to solve constrained nonlinear non-smooth prograing proble...
We consider a smooth penalty algorithm to solve nonconvex optimization problem based on a family of ...
A class of constrained nonsmooth nonconvex optimization problems, that is, piecewise C2 objectives w...
In this dissertation consideration is given to the optimization of a function of n variables subject...
In this paper, we propose a parameter perturbation homotopy continuation method for solving fixed po...
In this paper, we propose a homotopy continuous method (HCM) for solving a weak efficient solution o...
Abstract: We propose a new method for solving nonconvex semi-infinite problems by using a concave ov...
AbstractAs a powerful mechanism, fixed point theorems have many applications in mathematical and eco...
AbstractIn this paper, a constraint shifting combined homotopy method for solving multi-objective pr...
For many years, globally convergent probability-one homotopy methods have been remarkably succes...
AbstractIn this paper, a new algorithm for tracing the combined homotopy path of the non-convex nonl...
Probability-one homotopy methods are a class of algorithms for solving nonlinear systems of equation...
Homotopy methods are powerful tools for solving nonlinear programming. Their global convergence can ...
A trust-region algorithm for solving the equality constrained optimization problem is presented. Thi...
The basic theory for probability one globally convergent homotopy algorithms was developed in 1976, ...
In this paper we introduce a new approach to solve constrained nonlinear non-smooth prograing proble...
We consider a smooth penalty algorithm to solve nonconvex optimization problem based on a family of ...
A class of constrained nonsmooth nonconvex optimization problems, that is, piecewise C2 objectives w...
In this dissertation consideration is given to the optimization of a function of n variables subject...
In this paper, we propose a parameter perturbation homotopy continuation method for solving fixed po...
In this paper, we propose a homotopy continuous method (HCM) for solving a weak efficient solution o...
Abstract: We propose a new method for solving nonconvex semi-infinite problems by using a concave ov...
AbstractAs a powerful mechanism, fixed point theorems have many applications in mathematical and eco...