Showing total 6 results

1. Theoretical and computational results about optimality-based domain reductions.

Author

Caprara, Alberto, Locatelli, Marco, and Monaci, Michele

Subjects

GLOBAL optimization, MATHEMATICAL optimization, MATHEMATICAL analysis, MATHEMATICS, MAXIMA & minima

Abstract

In this paper we discuss optimality-based domain reductions for Global Optimization problems both from the theoretical and from the computational point of view. When applying an optimality-based domain reduction we can easily define a lower limit for the reduction which can be attained, but we can hardly guarantee that such limit is reached. Here, we theoretically prove that, for a nontrivial class of problems, appropriate strategies exist that are always able to reach this lower limit. On the other hand, we will also show that the same strategies lose this property as soon as we slightly enlarge the class of problems. Next, we perform computational experiments with a standard B&B approach applied to Linear Multiplicative Programming problems. We aim at establishing a good trade off between the quality of the domain reduction (the higher the quality, the lower the number of nodes in the B&B tree), and the computational cost of the domain reduction, and, thus, the effort per node of the B&B tree. [ABSTRACT FROM AUTHOR]

Published

2016

2. A Note on Optimality Conditions for Multi-objective Problems with a Euclidean Cone of Preferences.

Author

Golubin, A.

Subjects

PARETO optimum, MATHEMATICAL optimization, MATHEMATICAL analysis, MATHEMATICS, MAXIMA & minima, OPERATIONS research

Abstract

The paper suggests a new-to the best of the author's knowledge-characterization of decisions, which are optimal in the multi-objective optimization problem with respect to a definite proper preference cone, a Euclidean cone with a prescribed angular radius. The main idea is to use the angle distances between the unit vector and points of utility space. A necessary and sufficient condition for the optimality in the form of an equation is derived. The first-order necessary optimality conditions are also obtained. [ABSTRACT FROM AUTHOR]

Published

2015

3. Constrained Nonconvex Nonsmooth Optimization via Proximal Bundle Method.

Author

Yang, Yang, Pang, Liping, Ma, Xuefei, and Shen, Jie

Subjects

NONSMOOTH optimization, MATHEMATICAL optimization, MATHEMATICAL analysis, MATHEMATICS, MAXIMA & minima

Abstract

In this paper, we consider a constrained nonconvex nonsmooth optimization, in which both objective and constraint functions may not be convex or smooth. With the help of the penalty function, we transform the problem into an unconstrained one and design an algorithm in proximal bundle method in which local convexification of the penalty function is utilized to deal with it. We show that, if adding a special constraint qualification, the penalty function can be an exact one, and the sequence generated by our algorithm converges to the KKT points of the problem under a moderate assumption. Finally, some illustrative examples are given to show the good performance of our algorithm. [ABSTRACT FROM AUTHOR]

Published

2014

4. Geometrical and Topological Properties of a Parameterized Binary Relation in Vector Optimization.

Author

Sommer, Christian

Subjects

GEOMETRY, MATHEMATICS, MATHEMATICAL optimization, MATHEMATICAL analysis, MAXIMA & minima

Abstract

In real linear spaces, partial orderings are usually generated by ordering cones. In many situations, however, such an ordering cone is too small with respect to the whole space. Therefore, in this paper, we extend the concept of ordering cones to a more general concept. For this purpose, we define a parameterized binary relation, based on a convex cone and a binary function. We investigate some geometrical and topological properties of this relation in detail. [ABSTRACT FROM AUTHOR]

Published

2014

5. On the Existence of Minimizers of Proximity Functions for Split Feasibility Problems.

Author

Wang, Xianfu and Yang, Xinmin

Subjects

FEASIBILITY problem (Mathematical optimization), MATHEMATICAL optimization, CONVEX sets, MATHEMATICAL analysis, MATHEMATICS, MAXIMA & minima

Abstract

Many inverse problems can be formulated as split feasibility problems. To find feasible solutions, one has to minimize proximity functions. We show that the existence of minimizers to the proximity function for Censor-Elfving's split feasibility problem is equivalent to the existence of projections on appropriate convex sets and provide conditions under which such projections exist. These projections turn out to be the unique optimal solution of their Fenchel-Rockafellar duals and can be computed by the proximal point algorithm efficiently. Applications to linear equations and linear feasibility problems are given. [ABSTRACT FROM AUTHOR]

Published

2015

6. Reverse propagation of McCormick relaxations.

Author

Wechsung, Achim, Scott, Joseph, Watson, Harry, and Barton, Paul

Subjects

GLOBAL optimization, MATHEMATICAL optimization, MATHEMATICAL analysis, MATHEMATICS, MAXIMA & minima

Abstract

Constraint propagation techniques have heavily utilized interval arithmetic while the application of convex and concave relaxations has been mostly restricted to the domain of global optimization. Here, reverse McCormick propagation, a method to construct and improve McCormick relaxations using a directed acyclic graph representation of the constraints, is proposed. In particular, this allows the interpretation of constraints as implicitly defining set-valued mappings between variables, and allows the construction and improvement of relaxations of these mappings. Reverse McCormick propagation yields potentially tighter enclosures of the solutions of constraint satisfaction problems than reverse interval propagation. Ultimately, the relaxations of the objective of a non-convex program can be improved by incorporating information about the constraints. [ABSTRACT FROM AUTHOR]

Published

2015