AbstractA finite algorithm is presented for solving the quasi-concave minimization problem subject to linear constraints. The concept of an extreme point is generalized to that of an extreme facet of a polyhedron. Then a search routine is developed for the detection of an extreme facet of the feasible region relative to the polyhedron defined by the current set of cuts. After identifying an extreme facet we cut it off by a cut developed for this purpose. We call this cut the facet cut. The method is both compatible with other cutting procedures and is finite.
© 2018, Pleiades Publishing, Ltd. We propose a method which belongs to a class of cutting methods fo...
A convex programming algorithm for linear constraints is developed which essentially involves the so...
AbstractA readily implementable algorithm is proposed for minimizing any convex, not necessarily dif...
AbstractThis paper proposes an algebra approach for solving the linearly constrained continuous quas...
We consider the problem of minimizing a class of quasi-concave functions over a convex set. Quasi-co...
In this paper, we develop a kind of branch-and-bound algorithm for solving con-cave minimization pro...
Methodology is described for the global solution to problems of the form minimize f(x) subject to x[...
AbstractOne of the major computational bottlenecks of using the conventional cutting plane approach ...
summary:The problem of utilizing facet reflections to bring a point outside of a convex polytope to ...
Motivated by the successful application of mathematical programming techniques to difficult machine ...
Copyright © by the paper's authors.An algorithm is suggested for solving a convex programming proble...
International audienceWe propose a relaxed-inertial proximal point type algorithm for solving optimi...
In this paper we study linear optimization problems with a newly introduced concept of multi-dimensi...
A sufficient optimality criterion for linearly-constrained concave minimization problems is given in...
Finite termination, at point satisfying the minimum principle necessary optimality condition, is est...
© 2018, Pleiades Publishing, Ltd. We propose a method which belongs to a class of cutting methods fo...
A convex programming algorithm for linear constraints is developed which essentially involves the so...
AbstractA readily implementable algorithm is proposed for minimizing any convex, not necessarily dif...
AbstractThis paper proposes an algebra approach for solving the linearly constrained continuous quas...
We consider the problem of minimizing a class of quasi-concave functions over a convex set. Quasi-co...
In this paper, we develop a kind of branch-and-bound algorithm for solving con-cave minimization pro...
Methodology is described for the global solution to problems of the form minimize f(x) subject to x[...
AbstractOne of the major computational bottlenecks of using the conventional cutting plane approach ...
summary:The problem of utilizing facet reflections to bring a point outside of a convex polytope to ...
Motivated by the successful application of mathematical programming techniques to difficult machine ...
Copyright © by the paper's authors.An algorithm is suggested for solving a convex programming proble...
International audienceWe propose a relaxed-inertial proximal point type algorithm for solving optimi...
In this paper we study linear optimization problems with a newly introduced concept of multi-dimensi...
A sufficient optimality criterion for linearly-constrained concave minimization problems is given in...
Finite termination, at point satisfying the minimum principle necessary optimality condition, is est...
© 2018, Pleiades Publishing, Ltd. We propose a method which belongs to a class of cutting methods fo...
A convex programming algorithm for linear constraints is developed which essentially involves the so...
AbstractA readily implementable algorithm is proposed for minimizing any convex, not necessarily dif...